Answer:
To approximate y = sin(x) using the third-degree Taylor polynomial, we need to find the polynomial that best approximates sin(x) in the neighborhood of x = 0.
The third-degree Taylor polynomial for sin(x) centered at x = 0 is given by:
P3(x) = x - (1/6)x^3
Now we can graph both functions, y = sin(x) and P3(x), over the interval [-7,7].
To do this, we can plot points for both functions and then connect the points with a smooth curve. We can choose x-values that are evenly spaced over the interval and calculate the corresponding y-values using sin(x) and P3(x).
For example, if we choose x = -7, -6, -5, ..., 5, 6, 7, then we can calculate the y-values as follows:
For sin(x):
sin(-7) ≈ -0.656
sin(-6) ≈ 0.279
sin(-5) ≈ 0.958
...
sin(5) ≈ -0.959
sin(6) ≈ -0.279
sin(7) ≈ 0.657
For P3(x):
P3(-7) = -7 - (1/6)(-7)^3 ≈ -286.8
P3(-6) = -6 - (1/6)(-6)^3 ≈ -216
P3(-5) = -5 - (1/6)(-5)^3 ≈ -141.7
...
P3(5) = 5 - (1/6)(5)^3 ≈ 141.7
P3(6) = 6 - (1/6)(6)^3 ≈ 216
P3(7) = 7 - (1/6)(7)^3 ≈ 286.8
Now we can plot the points for sin(x) and P3(x) on the same graph and connect them with a smooth curve.
Here is what the graph looks like:
|
1 | ********
| ***
0 | **
| *
-1 |*
|
-2 | ********
| ****
-3 | ***
|**
-4 |
-------------------
-7 0 7
Best I can do for a graph, as I cannot send a valid link.
In the graph, the sinewave is represented by the curve with peaks and troughs, while the third-degree Taylor polynomial is represented by the straight line with a slight curve at the ends.
We can see that the third-degree Taylor polynomial provides a good approximation of sin(x) in the neighborhood of x = 0, but the approximation becomes less accurate as we move away from x = 0.
What is the relationship between 30 hours and 15 hours to complete the statement the number of hours student spent using electronic devices is times the number of hours spent playing sports
The relationship between 30 hours and 15 hours is that the number of hours spent using electronic devices is twice the number of hours of time spent playing sports, i.e. 30 hours = 2 x 15 hours.
There are different ways to approach this question, but one possible relationship between 30 hours and 15 hours to complete the statement "the number of hours students spent using electronic devices is times the number of hours spent playing sports" is:
If a student spends 30 hours using electronic devices and 15 hours playing sports, then the number of hours spent using electronic devices is twice the number of hours spent playing sports.
We can express this relationship using variables as follows:
Let E be the number of hours spent using electronic devices, and let S be the number of hours spent playing sports. Then, we can write:
E = 2S
If we substitute 30 for E and 15 for S in this equation, we get
30 = 2(15)
This equation is true, which means that the relationship holds for these particular values of E and S.
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Completely factor the expression below. 4x^ 2 + 14x + 10
The expression 4x^2 + 14x + 10 can be completely factored into 2(2x + 5)(x + 1).
We can begin by factoring out the biggest common factor of the three components, which is 2, in order to factor 4x2 + 14x + 10 completely:
4x^2 + 14x + 10 = 2(2x^2 + 7x + 5)
The quadratic expression 2x2 + 7x + 5 must now be factored. Finding two binomials whose product is equal to 2x2 + 7x + 5 will help us achieve this.
Choose two integers that sum up to 7 and multiply by 2*5 to factor the expression. These are the digits 2 and 5. Hence, we can write:
2x^2 + 7x + 5 = 2x^2 + 2x + 5x + 5
= 2x(x + 1) + 5(x + 1)
= (2x + 5)(x + 1)
Adding this to our initial expression yields the following:
4x^2 + 14x + 10 = 2(2x + 5)
(x + 1)
As a result, the phrase 2(2x + 5)(x + 1) may completely factor the expression 4x2 + 14x + 10.
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5.4 Claim severity per period is distributed as \( \mathcal{B N}(4,0.2) \). Calculate the probability of ruin at or before time 3 if the initial surplus is 3 .
The probability of ruin at or before time 3 with initial surplus 3 is 0.6915
The probability of ruin at or before time 3 with initial surplus 3, given the claim severity per period follows a binomial normal distribution with mean 4 and standard deviation 0.2, is calculated as follows:
Determine the z-score from the normal distribution corresponding to a surplus of 3 and a mean of 4.
z-score = (3-4)/0.2 = -0.5
Hence, the z-score result is -0.5
The next step is to use the cumulative probability density function to calculate the probability of ruin.
Probability of ruin = 1 - CDF(-0.5) = 1 - 0.3085 = 0.6915
Therefore, the probability of ruin at or before time 3 with initial surplus 3 is 0.6915.
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what is the answer to using the foil method (2x - 1/2) 2
Answer:
To use the FOIL method to simplify the expression (2x - 1/2)^2, follow these steps:
F: Multiply the first terms in each set of parentheses:
(2x) * (2x) = 4x^2
O: Multiply the outer terms in each set of parentheses:
(2x) * (-1/2) = -x
I: Multiply the inner terms in each set of parentheses:
(-1/2) * (2x) = -x
L: Multiply the last terms in each set of parentheses:
(-1/2) * (-1/2) = 1/4
Now, combine the like terms:
4x^2 - x - x + 1/4
Simplify by combining like terms:
4x^2 - 2x + 1/4
Therefore, (2x - 1/2)^2 = 4x^2 - 2x + 1/4.
Are 2x+3 and 3x-6 the same value
Answer:
It depends what x is equal to.
Step-by-step explanation:
For example, the expressions 2x+3 and 3x-6 are equal when x=9.
They can be expressed by 2x+3=3x-6
(2×9)+3=21
(3×9)-6=21
5. Which is the value of the 3rd term in the expansion of (x + 6)6
The value of the 3rd term in the expansion of (x+6) ^6 will be as follows:
540x^4
What is expansion?
Expanding brackets, also known as multiplying out, seeks to eliminate the set of brackets by multiplying each phrase inside a bracket by the term on the outside and subsequently accumulating similar phrases. When solving equations, extending brackets, which is the opposite of factorization, is frequently an essential step.
Here in the question,
We have,
(x+6) ^6
Expanding it we get:
= x^6 + 36x^5 + 540x^4 +4320x³ + 19440x² + 46656x + 46656
So, the 3rd term of the expansion is 540x^4.
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The value of the 3rd term in the expansion of [tex](x+6) ^6[/tex] will be as follows: [tex]540x^4[/tex]. The correct answer is option (c). [tex](6\ \ 4)36x^4[/tex]
What is expansion?By multiplying each phrase inside a bracket by the word on the outside and then accumulating similar phrases, expanding brackets, also known as multiplying out, aims to eliminate the set of brackets. Extending brackets, which is the opposite of factorization, is frequently a crucial stage in the solution of equations.
An affine transformation termed expansion, in which the scale is expanded, is also referred to as an enlargement or dilation. It is also sometimes referred to as an enlargement and is the polar opposite of a geometric constriction.
Here in the question,
We have,
[tex](x+6) ^6[/tex]
Expanding it we get:
[tex]= x^6 + 36x^5 + 540x^4 +4320x^3 + 19440x^2 + 46656x + 46656[/tex]
So, the 3rd term of the expansion is [tex]540x^4[/tex].
The correct answer is option (c). [tex](6\ \ 4)36x^4[/tex]
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A golf ball is hit into the air the path of the ball can be described by the equation h=55t-5t^2 where h is the height of the ball in meters and t is time in seconds
Hence time can be 0 to 11 sec when the ball is on the ground.It doesn't go that high.The max height is 123.75 meters, at t = 5.5 seconds.
Any object launched into space with only gravity acting on it is referred to as a projectile. Gravity is the main force affecting a projectile. This doesn't imply that other forces don't affect it; it merely means that their impact is far smaller than that of gravity. A projectile's trajectory is its route after being fired. A projectile is something that is launched or batted, as a baseball.
A golf ball is hit into the air the path of the ball can be described by the equation h=55t-5[tex]t^2[/tex] where h is the height of the ball in meters and t is time in seconds,
When ball is on the ground h=0,
[tex]55t-5t^2=0\\\\t(55-5t)=0[/tex]
t=0 and t=11
Hence time can be 0 to 11 sec when the ball is on the ground.
[tex]55t-5t^2=160\\11t-t^2-32=0\\t^2-11t+32=0\\t=\frac{(11 \ +-\sqrt{11^2-4*1*32}}{2}\\\\t=\frac{11+-\sqrt{7i^2}}{2}\\\\t=\frac{11-+7i}{2}[/tex]
It doesn't go that high.
The max height is 123.75 meters, at t = 5.5 seconds.
The complete question is-
A golf ball is hit in the air. the path of the golf ball can be described by the equation h = 55t - 5t2, where h is the height of the ball in meters and t, is the time after how many seconds will the ball be in 160 high
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The triangles below are similar. Calculate the length of the unknown sides.
The values of x and y for the similar triangles are 8m and 9m respectively.
How to calculate for x and y for the similar trianglesWe have the triangles to be similar, this implies that the length EF of the smaller triangle is similar to the length BC of the larger triangle
and the length DF of the smaller triangle is similar to the length AC of the larger triangle
so;
8m/16m = 4m/x
x = (16m × 4m)/8m {cross multiplication}
x = 2 × 4m
x = 8m
y/18m = 8m/16m
y = (18m × 8m)/16m {cross multiplication}
y = 18m/2
y = 9m
Therefore, the values of x and y for the similar triangles are 8m and 9m respectively.
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Isabella drives 45 miles in 30 minutes. If she drove three hours in total at the same rate, how far did she go?
Answer: 270 miles
Step-by-step explanation:
an hour contains 60 minutes and 3 hours contain 180 minutes so all you have to do is 180 divided by 30 which equals 6 and multiply 6 by 45 and that's your answer on how far she went.
Answer:
Isabella would have gone 270 miles in 180 minutes.
Step-by-step explanation:
60 times 3 = 180
There are 60 minutes in one hour, and there are three hours.
180 divided by 30 = 6
180 is divided by 30 because the rate of speed we know is 45 miles in 30 minutes.
45 times 6 = 270
There were 6 30s in 180, so 45 is multiplied by 6.
hope this helps
HELP WITH THIS PLSS S
The statement illustrates the transitive property of congruence, which is a fundamental concept in geometry.
What is transitive property of congruence?This property states that if two geometric figures are congruent to a third figure, then they are congruent to each other.
In the given statement, ΔABC is congruent to ΔDEF, and ΔDEF is congruent to ΔXYZ. By the transitive property, we can conclude that ΔABC is also congruent to ΔXYZ.
This property is important because it allows us to establish relationships between geometric figures based on their congruence. It is used in many geometric proofs and applications, such as proving theorems, solving problems involving similar triangles, and determining the congruence of geometric shapes.
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The area of a rectangle is 195 dm². The width is two less than the length. What is the length and the width of tge rectangle?
The length of the rectangle is 15 dm and the width is 13 dm.
Let's assume that the length of the rectangle is "L" and the width is "W".
From the problem statement, we have two pieces of information:
The area of the rectangle is 195 dm²:
Area = Length x Width
195 dm² = L x W
The width is two less than the length:
W = L - 2
Now, we can substitute the second equation into the first equation to eliminate W and get an equation with only one variable:
195 dm² = L x (L - 2)
Simplifying the equation:
195 dm² = L² - 2L
L² - 2L - 195 dm² = 0
To solve for L, we can use the quadratic formula:
L = (-b ± √(b² - 4ac)) / 2a
Where a = 1, b = -2, and c = -195.
L = (2 ± √(2² + 4 x 1 x 195)) / 2 x 1
L = (2 ± √4 + 780) / 2
L = (2 ± √784) / 2
L = (2 ± 28) / 2
L = 15 or L = -13
Since the length can't be negative, the length of the rectangle is L = 15 dm.
Now we can use the equation W = L - 2 to find the width:
W = 15 dm - 2 dm
W = 13 dm
Therefore, the length of the rectangle is 15 dm and the width is 13 dm.
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can yall help me with this i cant even solve this with a calculator
A family goes to a restaurant. When the bill comes, this is printed at the bottom of it:
Gratuity Guide For Your Convenience:
15% would be $4.89
18% would be $5.87
20% would be $6.52
How much was the price of the meal?(Round to the nearest cent)
Step-by-step explanation:
We can start by assuming that the price of the meal is x dollars. Then, we know that:
15% of x is equal to $4.89
18% of x is equal to $5.87
20% of x is equal to $6.52
We can set up three equations using these statements:
0.15x = 4.89
0.18x = 5.87
0.20x = 6.52
Solving for x in each equation, we get:
x = 4.89 / 0.15 = 32.60
x = 5.87 / 0.18 = 32.61
x = 6.52 / 0.20 = 32.60
Since all three equations give us a value of x that is very close to 32.60, we can assume that the price of the meal was $32.60, rounded to the nearest cent.
Please help me with this thank youuu
Answer:
4
Step-by-step explanation:
V = πr²h
h = V/πr² = (314) / π(5)² ≈ 4
According to a poll of adults, about
49%
work during their summer vacation. Assume that the true proportion of all adults that work during summer vacation is
p=0.49
. Now consider a random sample of 300 adults. Complete parts a and
b
below. a. What is the probability that between
44%
and
54%
of the sampled adults work during summer vacation? The probability is (Round to three decimal places as needed.) b. What is the probability that over
67%
of the sampled adults work during summer vacation? The probability is (Round to three decimal places as needed.)
The probability that between 44% and 54% of the sampled adults work during summer vacation is approximately 1.
What is normal distribution?The most important continuous probability distribution in probability theory and statistics is the normal distribution, often known as the gaussian distribution. It is also known as a bell curve sometimes. In every physical field and in economics, the normal distribution accurately or nearly represents a huge number of random variables. Moreover, it may be used to approximate different probability distributions, supporting the employment of the name "normal" as in reference to the most common distribution.
Given that, adults that work during summer vacation is:
p=0.49
The mean is:
μ = np = (300)(0.49) = 147
The standard deviation is given by:
σ = sqrt(npq) = sqrt((300)(0.49)(0.51)) ≈ 8.24.
Now, the probability that between 44% and 54%:
z1 = (0.44 - 0.49) / 0.00824 ≈ -6.07
z2 = (0.54 - 0.49) / 0.00824 ≈ 6.07
The area under this curve using the z-table is 1.
Thus, probability that between 44% and 54% of the sampled adults work during summer vacation is approximately 1.
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can someone please help my questions never get answered
Find the domain of each function:
Therefore , the solution of the given problem of function comes out to be the range of r(t) is [22 - 483, 22 + 483].
Define function.The midterm test questions will cover all of the topics, including fictitious and real places as well as mathematical variable design. a diagram showing the relationships between different elements that cooperate to create the same result. A service is composed of numerous distinctive components that cooperate to create distinctive results for each input. Every mailbox has a particular area that might be used as a haven.
Here,
For all real values of t such that the expression inside the cube root is non-negative, the function r(t) = (t2 - 44t + 1) is specified.
Therefore, in order to determine the scope of r, we must resolve the inequality t2 - 44t + 1 0.(t).
The quadratic method can be used to eliminate this inequality:
=> t = [44 ± √(44² - 4(1)(1))]/(2(1))
=> t = [44 ± √(1936 - 4)]/2
=> t = [44 ± √1932]/2
=> t = [44 ± 2√483]/2
=> t = 22 ± √483
Consequently, the range of r(t) is [22 - 483, 22 + 483].
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SOMEBODY HELP PLEASE IF YOU CAN
Answer:
484π or 1520.530844
Step-by-step explanation:
4xπx11²
AB is diameter of a circle whose center is at (1,1) , if A is at (-3,3), what are the coordinates of B
The coordinates of B of the diameter of the circle is: (5, -1).
How to Find the Coordinates of the Endpoints of the Diameter of a Circle?Since AB is a diameter of the circle, its midpoint will be the center of the circle, which is given to be (1, 1). Therefore, we can find the coordinates of point B by using the midpoint formula.
Midpoint formula:
The midpoint of a line segment with endpoints (x1, y1) and (x2, y2) is ((x1+x2)/2, (y1+y2)/2).
Let A be (-3, 3), which is one endpoint of the diameter AB. Let B be the other endpoint of the diameter AB.
Since the midpoint of AB is (1, 1), we have:
((x-coordinate of A + x-coordinate of B)/2, (y-coordinate of A + y-coordinate of B)/2) = (1, 1)
Substituting the coordinates of point A, we get:
((-3 + x-coordinate of B)/2, (3 + y-coordinate of B)/2) = (1, 1)
Multiplying both sides of each equation by 2, we get:
(-3 + x-coordinate of B, 3 + y-coordinate of B) = (2, 2)
Adding 3 to both sides of the first equation and subtracting 3 from both sides of the second equation, we get:
(x-coordinate of B, y-coordinate of B) = (2+3, 2-3) = (5, -1)
Therefore, the coordinates of point B are (5, -1).
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A boat travels at a speed of 20 miles per hour in still water. It travels 48 miles upstream, and then returns to the starting point in a total of five hours. What is the speed of the current (in miles per hour.)?
The speed of the current is approximately 39.05 miles per hour.
How is distance calculated?Distance equals rate times time in the equation for distance, rate, and time. This equation shows how far an item moves over a specific amount of time at a specific pace by relating the three variables in a linear equation. Any of the three variables can be solved for by rearranging the formula.
Let us suppose the speed of current = c.
Then the formula for distance is given as:
distance = rate x time
For upstream:
distance = 48 miles
rate = 20 - c miles per hour
time = distance / rate
= 48 / (20 - c) hours
For downstream:
distance = 48 miles
rate = 20 + c
time = distance / rate
= 48 / (20 + c) hours
The total time for the trip is 5 hours thus,
48 / (20 - c) + 48 / (20 + c) = 5
Taking the LCM:
48(20 + c) + 48(20 - c) = 5(20 - c)(20 + c)
1920 = 400 - c²
c² = 1520
c ≈ 39.05 miles per hour
Hence, the speed of the current is approximately 39.05 miles per hour.
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Marques wants to use a sheet of fiberboard 36 inches long to create a skateboard ramp with a 30 degree angle of elevation from the ground. How high will the ramp rise from the ground at its highest end? Round your answer to the nearest tenth of an inch if necessary.
The ramp will rise 18 inches from the ground at its highest end.
To determine the height of the ramp at its highest end, we can use trigonometry and the given angle of elevation.
In a right triangle formed by the ramp, the ground, and the height of the ramp, the angle of elevation (30 degrees) is the angle between the ground and the hypotenuse (the ramp itself). The height of the ramp is the opposite side, and the length of the ramp is the hypotenuse.
Using the trigonometric function sine (sin), we can set up the equation:
sin(30 degrees) = opposite/hypotenuse
sin(30 degrees) = height/36 inches
Since the sine of 30 degrees is 0.5:
0.5 = height/36 inches
To solve for the height, we can multiply both sides of the equation by 36:
0.5 x 36 inches = height
18 inches = height
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Evaluate Piecewise Functions
The required value of the function at x=-2 is 10.
What is function?A function in mathematics from a set X to a set Y assigns precisely one element of Y to each element of X. The sets X and Y are collectively referred to as the function's domain and codomain, respectively. Initially, functions represented the idealized relationship between two variable quantities.
According to question:We have
f(x) = -x + 3 for x≤-3
= -3x - 4 for -3 ≤ 1
= -(x- 2)² + 5 for x > 1
To find F(-2) we have to take
f(x) = -3x + 4
f(-2) = -3(-2) + 4
f(-2) = 6 + 4
f(-2) = 10.
Thus, required value of the function is 10.
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# 16 i
You are given that ZYZW and ZZYX are right angles. What additional piece of information allows you to prove that AWYZAXZY?
W
N
OYZ ZY
O WY XZ
O WZ|XY
O ZYLXY
Previous
11 12
13
14
15
16 17 18 19 20
Next
The additional information that would be needed to prove that △WYZ and △XZY are congruent is (B) WY ≅ ZX.
What is the congruency of triangles?Triangle congruence: If all three corresponding sides and all three corresponding angles are equal in size, two triangles are said to be congruent.
Slide, twist, flip, and turn these triangles to create an identical appearance.
According to the ASA congruence rule, two triangles are congruent when their two included sides and two included angles are equivalent to each other.
So, we know that:
In △WYZ and △XZY:
ZY = ZY (Common)
∠Z = ∠Y (90°)
Then, additional information could be:
WY ≅ ZX
Therefore, the additional information that would be needed to prove that △WYZ and △XZY are congruent is (B) WY ≅ ZX.
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A local university has a current enrollment of 12,000 students. The enrollment is increasing continuously at a rate of 2. 5% each year. Which logarithm is equal to the number of years it will take for the population to increase to 15,000 students?
The logarithm that is equal to the number of years it will take for the population to increase to 15,000 students is log(11.08).
Let t be the number of years it will take for the enrollment to increase to 15,000 students. We can use the formula for continuous growth to set up an equation:
[tex]A = Pe^{(rt)[/tex]
where A is the final amount, P is the initial amount, r is the annual growth rate as a decimal, and t is the time in years.
In this case, we know that P = 12,000, A = 15,000, and r = 0.025 (since the growth rate is 2.5%). Plugging these values into the equation, we get:
[tex]15,000 = 12,000 e^{(0.025t)[/tex]
Dividing both sides by 12,000, we get:
[tex]1.25 = e^{(0.025t)[/tex]
To solve for t, we can take the natural logarithm of both sides:
[tex]ln(1.25) = ln(e^{(0.025t))[/tex]
Using the property of logarithms that [tex]ln(e^x) = x[/tex], we can simplify the right-hand side:
ln(1.25) = 0.025t
Finally, dividing bοth sides by 0.025, we get:
t = ln(1.25)/0.025
Using a calculatοr tο evaluate ln(1.25)/0.025, we get:
t ≈ 11.08
Therefοre, the lοgarithm that is equal tο the number οf years it will take fοr the pοpulatiοn tο increase tο 15,000 students is lοg(11.08)
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Show that the number is a zero of f(x) of the given multiplicity, and express f(x) as a product of linear factors.f(x) = x^6 − 12x^5 + 45x^4 − 405x^2 + 972x − 729; 3 (mult. 5)
Given function, f(x) = x^6 - 12x^5 + 45x^4 - 405x^2 + 972x - 729; 3 (mult. 5).
Zeroes of f(x) are the values of x for which f(x) = 0. So, f(x) is factorable if and only if we can find zeroes of f(x).
Let's solve f(x) = 0 using x = 3 as the initial guess. Then, f(3) = 3^6 - 12(3^5) + 45(3^4) - 405(3^2) + 972(3) - 729 = 0. So, x = 3 is a zero of f(x) of the given multiplicity, which is 5.
Since x = 3 is a zero of f(x) of multiplicity 5, we can represent f(x) as follows:
$$f(x) = (x-3)^5 p(x)$$
where p(x) = EXPRESSF[X] and EXPRESSF[X] is a polynomial expression in x.
Now, we have to find the polynomial expression p(x) so that we can express f(x) as a product of linear factors.
The best way to find p(x) is by polynomial division:
$$\begin{array}{r|rrrrrr} &x^5&-5x^4&30x^3&-90x^2&180x&-243\\hline x-3&x^6&-12x^5&45x^4&-405x^2&972x&-729\\hline &x^6&-3x^5&+18x^4&-45x^3&135x^2&-243x\ & & & &360x^3&-1080x^2&648x\ & & & &360x^3&-1080x^2&648x\ & & & & &1260x^2&-891x\ & & & & &1260x^2&-3780x\ & & & & & &2889x\\end{array}$$
So, p(x) = x^5 - 3x^4 + 18x^3 - 45x^2 + 135x - 243.
Therefore, we can express f(x) as a product of linear factors as follows:
$$\begin{aligned}f(x) &= (x-3)^5 p(x)\ &= (x-3)^5 (x^5 - 3x^4 + 18x^3 - 45x^2 + 135x - 243)\ &= (x-3)^5 (x-3) (x^4 + 2x^3 + 12x^2 + 36x + 81)\ &= (x-3)^6 (x^4 + 2x^3 + 12x^2 + 36x + 81)\ \end{aligned}$$
Therefore, f(x) is a product of linear factors.
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What is one method to find the measure of angle b?
Angle B is 50 degrees in measurement.
One method to find the measure of angle b is to use the properties of angles in a triangle. We know that the sum of the angles in a triangle is 180 degrees. We also know that angles a and c have measures of 50 degrees and 80 degrees respectively. Therefore, we can find the measure of angle b by subtracting the sum of angles a and c from 180 degrees:
angle b = 180 degrees - angle a - angle c
angle b = 180 degrees - 50 degrees - 80 degrees
angle b = 50 degrees
Therefore, angle b has a measure of 50 degrees. Another method to find the measure of angle b is to use trigonometry, such as the sine or cosine rule, depending on the given information.
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What is one method to find the measure of angle B?
A. use the Pythagorean theorem to find BC, then solve the equation tan(B)=8/BC
B. because of the 30-60-90 triangle theorem, you know the measure of angle B is 60
C. solve the equation cos(B)=8/89(square rooted)
Find the difference quotient of \( f(x)=x^{2}-1 \); that is find \( \frac{f(x+h)-f(x)}{h}, h \neq 0 \). Be sure to simplify. The difference quotient is
The difference quotient of the function[tex]\(f(x)=x^{2}-1\) is \(2x+h\)[/tex], where [tex]\(h\)[/tex] is the small change in [tex]\(x\)[/tex]
The difference quotient of the function [tex]\(f(x)=x^{2}-1\)[/tex] can be found by using the following formula: [tex]\[\frac{f(x+h)-f(x)}{h}, h\neq0\][/tex]. We can start by substituting the given function into the formula and simplify the expression as follows:[tex]\[\frac{(x+h)^{2}-1-(x^{2}-1)}{h}\],[/tex]
First, let's expand the expression by using the formula for the square of a binomial:[tex][(x+h)^{2}=x^{2}+2hx+h^{2}\][/tex],
Substituting this into the expression above, we get: [tex][\frac{x^{2}+2hx+h^{2}-1-x^{2}+1}{h}\][/tex], Simplifying the expression, we can cancel out the [tex]\(x^{2}\)[/tex] terms, and the [tex](1\)s:\[\frac{2hx+h^{2}}{h}\][/tex]
Next, we can factor out the \(h\) from the numerator: [tex]\[h\cdot\frac{2x+h}{h}\][/tex].
Cancelling out the [tex]\(h\)s[/tex], we get:[tex]\[2x+h\][/tex] ,Therefore, the difference quotient of the function [tex]\(f(x)=x^{2}-1\) is \(2x+h\)[/tex], where [tex]\(h\)[/tex] is the small change in [tex]\(x\)[/tex].
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Write an inequality to describe each situation. a. The minimum age for voting in the United States is 18 years old. Let a represent a voter's age. b. A theater seats up to 275 people. Let p represent the number of people attending a performance in the theater.
Answer:
a ≥ 18
p ≤ 275
Step-by-step explanation:
a. The inequality for the minimum age for voting in the United States is:
a ≥ 18
This inequality states that a person's age (represented by 'a') must be greater than or equal to 18 years in order to be eligible to vote in the United States.
b. The inequality for the maximum number of people that can attend a performance in the theater is:
p ≤ 275
This inequality states that the number of people (represented by 'p') attending a performance in the theater must be less than or equal to 275 in order to accommodate all attendees within the seating capacity of the theater.
The graph shows the responses of 120 students who were asked whether they spend too much or too little time watching
television.
Television Viewing
Too little 30%
About
right 5%
Too much 20%
Don't know 45%
How many thought they watched too much television?
a.
6 students
b. 24 students
c. 28students
d. 36 students
The answer is (b) 24 students thought they watched too much television.
The solution of the given question are as following :-
The given graph represents the responses of 120 students who were surveyed about their television viewing habits. The students were asked whether they spent too little, about the right amount, or too much time watching television, or whether they didn't know.
Out of the total 120 students surveyed, 30% thought that they spent too little time watching television, while only 5% felt that they spent about the right amount of time. A further 20% felt that they spent too much time watching television, while the remaining 45% didn't know.
To answer the question of how many students thought they watched too much television, we need to focus on the 20% who said that they spent too much time watching TV. This percentage can be converted to a whole number by multiplying it with the total number of students surveyed, which is 120.
20/100 x 120 = 24
Therefore, 24 students out of 120 thought that they watched too much television.
The survey results indicate that a significant proportion of students, 50% (30% who thought they watched too little and 20% who thought they watched too much), felt that they were not watching the right amount of television. This suggests that there may be a need for students to be more mindful of their television viewing habits and make adjustments accordingly.
It's also worth noting that nearly half of the surveyed students, 45%, were unsure about how much television they watched. This could be because they don't pay attention to the amount of time they spend watching TV or because they have a hard time evaluating whether their television viewing habits are appropriate.
Overall, the survey results highlight the importance of being mindful of how much time we spend watching television and making sure that we are not spending too much time on it. It's also essential to evaluate whether our television viewing habits align with our personal preferences and priorities.
The calculation part is as follows :-
Out of 120 students:
30% thought they watched too little television, which is 30/100 x 120 = 36 students.
5% thought they watched about the right amount of television, which is 5/100 x 120 = 6 students.
20% thought they watched too much television, which is 20/100 x 120 = 24 students.
45% didn't know how much television they watched, which is 45/100 x 120 = 54 students.
Therefore, the answer is (b) 24 students thought they watched too much television.
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Y-3=2(x+1), x equals -1, what is y?
Answer:
Y=3
Step-by-step explanation:
Put in x=-1
y-3 = 2(-1+1)
y-3 = 2(0)
y-3=0
add 3 more to both sides
y-3+3 = 0+3
y =3
(Don't forget Brainliyest)
Answer:
[tex] \sf \: y = 3[/tex]
Step-by-step explanation:
Now we have to,
→ Find the required value of y.
We have to use,
→ x = -1
The equation is,
→ y - 3 = 2(x + 1)
Then the value of y will be,
→ y - 3 = 2(x + 1)
→ y = 2(x + 1) + 3
→ y = 2((-1) + 1) + 3
→ y = 2(0) + 3
→ y = 0 + 3
→ [ y = 3 ]
Hence, the value of y is 3.
Please help with these word problems!?
To solve for x and y, we can use either substitution or elimination method. Let's use the elimination method by multiplying the second equation by 8 and subtracting it from the first equation.
What is the equations based on the information?1. Let x be the price of one senior citizen ticket and y be the price of one student ticket. We can set up two equations based on the information given:
4x + 5y = 102
7x + 5y = 126
We can solve for x and y using elimination or substitution. Here is one way to do it using elimination:
Multiply the first equation by -1 to get:
-4x - 5y = -102
Add this equation to the second equation to eliminate y:
3x = 24
Solve for x:
x = 8
Substitute x = 8 into one of the original equations to solve for y:
4(8) + 5y = 102
32 + 5y = 102
5y = 70
y = 14
Therefore, the price of one senior citizen ticket is S8 and the price of one student ticket is S14.
2. Let x be the speed of the plane in still air and y be the speed of the wind. We can set up two equations based on the information given:
x + y = 183
x - y = 141
We can solve for x and y using elimination or substitution. Here is one way to do it using addition:
Add the two equations to eliminate y:
2x = 324
Solve for x:
x = 162
Substitute x = 162 into one of the original equations to solve for y:
162 + y = 183
y = 21
Therefore, the speed of the plane in still air is 162 km/h and the speed of the wind is 21 km/h.
3. Let x be the cost of one apple pie and y be the cost of one lemon meringue pie. We can set up two equations based on the information given:
6x + 4y = 580
6x + 5y = 94
We can solve for x and y using elimination or substitution. Here is one way to do it using subtraction:
Subtract the second equation from the first equation to eliminate x:
y = 116
Substitute y = 116 into one of the original equations to solve for x:
[tex]6x + 4(116) = 580[/tex]
6x = 16
[tex]x = 8/3 or 2.67[/tex]
Therefore, the cost of one apple pie is S2.67 and the cost of one lemon meringue pie is S116.
4. Let's assume the price of one senior citizen ticket is "S" and the price of one child ticket is "C".
From the given information, we can form two equations:
[tex]3S + 3C = 569[/tex] ...(1) (sales on the first day)
[tex]5S + 3C = 981[/tex] ...(2) (sales on the second day)
To solve for S and C, we can use any method of solving linear equations (substitution, elimination, or matrix method). Here, we will use the substitution method.
From equation (1), we can express C in terms of S:
C = (569 - 3S)/3
Substituting this value of C in equation (2), we get:
[tex]5S + 3[(569 - 3S)/3] = 981[/tex]
Solving for S:
[tex]5S + 569 - 9S = 2943[/tex]
[tex]-4S = -2374[/tex]
[tex]S = 593.5[/tex]
Therefore, the price of one senior citizen ticket is [tex]S593.5[/tex] .
To find the price of one child ticket, we can substitute this value of S in equation (1) and solve for C:
[tex]3(593.5) + 3C = 569[/tex]
[tex]3C = -1518.5[/tex]
[tex]C = -506[/tex]
This doesn't make sense as the price of a ticket cannot be negative. It's possible that there was an error in the given information or in our calculations
5. Let the cost of one package of chocolate chip cookie dough be x, and the cost of one package of gingerbread cookie dough be y.
From the information given in the problem, we can set up the following system of equations:
[tex]8x + 12y = 5364[/tex] (Ming's sales)
[tex]x + 4y = 893[/tex] (Carlos's sales)
To solve for x and y, we can use either substitution or elimination method. Let's use the elimination method by multiplying the second equation by 8 and subtracting it from the first equation:
[tex]8x + 12y = 5364-8x - 32y = -7144-20y = -1780[/tex]
y = 89
Now we can substitute y = 89 into either equation to solve for x. Let's use the second equation:
[tex]x + 4(89) = 893[/tex]
[tex]x = 529[/tex]
Therefore, the cost of one package of chocolate chip cookie dough is $529, and the cost of one package of gingerbread cookie dough is $89.
6. Let the price of a senior citizen ticket be x, and the price of a child ticket be y.
From the information given in the problem, we can set up the following system of equations:
[tex]3x + 5y = 570[/tex] (first day sales)
[tex]12x + 12y = 2160[/tex] (second day sales)
To solve for x and y, we can use either substitution or elimination method. Let's use the elimination method by multiplying the first equation by 4 and subtracting it from the second equation:
[tex]12x + 12y = 2160[/tex]
[tex]-12x - 20y = -2280[/tex]
[tex]-8y = -120[/tex]
y = 15
Now we can substitute y = 15 into either equation to solve for x. Let's use the first equation:
[tex]3x + 5(15) = 570[/tex]
[tex]3x = 495[/tex]
[tex]x = 165[/tex]
Therefore, the price of a senior citizen ticket is $165, and the price of a child ticket is $15.
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