The estimated sum of the given series using the sum of the first 10 terms is 302,500, the improved estimate for the sum of the given series is between 305,000 and 306,000, and the value of n is 8.
(a) Utilizing the equation for the entirety of the primary n terms of the arrangement, we have:
[tex]s10 = 1^3 + 2^3 + ... + 10^3[/tex]
= 1,000 + 8,000 + ... + 1,000,000
= 302,500
In this manner, the assessed whole of the given arrangement using the entirety of the primary 10 terms is 302,500.
(b) For n = 10, we have:
[tex]sn = 1^3 + 2^3 + ... + 10^3 ≈ 302,500[/tex]
Utilizing the disparities with[tex]f(x) = x^3[/tex], we have:
[tex]sn + ∫[10,∞] x^3 dx ≤ s ≤ sn + ∫[10,∞] x^3 dx + 10^3[/tex]
Utilizing calculus, ready to assess the integrand:
[tex]sn + ∫[10,∞] x^3 dx = sn + [1/4 x^4] [10,∞] = sn + 2500[/tex]
[tex]sn + ∫[10,∞] x^3 dx + 10^3 = sn + [1/4 x^4] [10,∞] + 10^3 = sn + 3500[/tex]
Substituting sn = 302,500, we get:
302,500 + 2500 ≤ s ≤ 302,500 + 3500
305,000 ≤ s ≤ 306,000
In this manner, the made strides assess for the sum of the given arrangement is between 305,000 and 306,000.
(c) The Leftover portion Gauge for the Necessarily Test states that the mistake E in approximating the whole s of an interminable arrangement by the nth halfway entirety sn is:
[tex]E ≤ ∫[n+1,∞] f(x) dx[/tex]
In this case, we need to discover mean of n such that E < 10 using the integral test
xss=removed xss=removed> [tex][(10^-5 x 4)^(1/4)] - 1[/tex]
n > 7.9378
Subsequently, we require n = 8 to guarantee that the blunder within the estimation s ≈ sn is less than[tex]10^-5.[/tex]
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HELP ME!!!!!!!!!! LEAP PRACTICE (MATH)!!!!!!!!
Answer:
B
Step-by-step explanation:
Sara read for a constant rate for 6 days and got a total of 7 1/2 hours.
Therefore, the situation can be represented by the equation 1 1/4×6=7 1/2
let u be the vector with initial point (2,0) and terminal point (3,2). let v be the vector with initial point (2,2) and terminal point (0,1). find the sum of these vectors: u v .
The sum of the vectors u and v is (-1,1).
To find the sum of the vectors u and v, we need to add their corresponding components.
The vector u has initial point (2,0) and terminal point (3,2), which means its components are (3-2, 2-0) = (1,2).
The vector v has initial point (2,2) and terminal point (0,1), which means its components are (0-2, 1-2) = (-2,-1).
To find the sum of these vectors, we simply add their corresponding components:
u + v = (1,2) + (-2,-1) = (1-2, 2-1) = (-1,1).
Therefore, the sum of the vectors u and v is (-1,1).
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what is the sum of the measures of the exterior angles of a regular quadrilateral? if necessary, round to the nearest tenth.
For a regular quadrilateral, each exterior angle measures 90 degrees, so the sum of the exterior angles is 4 times 90 degrees, or 360 degrees.
In a regular quadrilateral, all angles are equal. To find the sum of the measures of the exterior angles, we can follow these steps:
1. Determine the sum of the interior angles of a quadrilateral, which is always 360 degrees.
The sum of the measures of the exterior angles of any polygon, including a regular quadrilateral, is always 360 degrees. This is because each exterior angle of a polygon is formed by extending one of the sides of the polygon, and the sum of the exterior angles is equal to the sum of the measures of the angles formed by all the sides of the polygon.
2. Since it's a regular quadrilateral, divide the sum by the number of sides (4) to find the measure of each interior angle. 360 / 4 = 90 degrees.
3. To find the measure of each exterior angle, subtract the measure of the interior angle from 180 degrees (since they are supplementary). 180 - 90 = 90 degrees.
4. Multiply the measure of one exterior angle by the number of sides (4) to find the sum of the measures of the exterior angles. 90 * 4 = 360 degrees.
The sum of the measures of the exterior angles of a regular quadrilateral is 360 degrees.
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indicate how each of the following transactions affects u.s. exports, imports, and net exports. a french historian spends a semester touring museums and historic battlefields in the united states.
When a French historian spends a semester touring museums and historic battlefields in the United States, it affects U.S. exports, imports, and net exports as follows:
- U.S. Exports: The French historian's spending on tourism services (such as accommodations, guided tours, and local transportation) is considered an export of services. As the historian spends money in the U.S., it will lead to an increase in U.S. exports.
- U.S. Imports: There is no direct impact on U.S. imports, as the historian's activities do not involve the U.S. purchasing goods or services from France or any other country.
- Net Exports: Since the French historian's spending increases U.S. exports without affecting imports, this will result in an increase in U.S. net exports (which is the difference between exports and imports).
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Carla is a waitress at daybreak diner, and she earns $5 for each hour she works. Last week, she earned $148 total, including $68 in tips. How many hours did Carla work last week?
A ship leaves port travelling at 32° travels for 5 nauticalmiles, then changes course counterclockwise by 32° and travels foranother 10 nautical miles. Using the law of sines or cosines, howfar away is the vessel from the port once it reaches the end of thejourney? Round to 2 decimal places.
Once it reaches the end of the journey, the vessel is approximately 13.68 nautical miles away from the port.
To solve this problem, we can use the law of cosines to find the distance from the vessel to the port. Let's label the angles and sides as follows:
- Angle A is the initial heading of 32 degrees
- Angle B is the counterclockwise change in heading of 32 degrees
- Angle C is the angle between sides a and b (the distance from the vessel to the port)
- Side a is the distance traveled in the first leg, which is 5 nautical miles
- Side b is the distance traveled in the second leg, which is 10 nautical miles
- Side c is the distance from the vessel to the port, which we want to find
Using the law of cosines, we have:
c^2 = a^2 + b^2 - 2ab cos(C)
Plugging in the values we know, we get:
c^2 = 5^2 + 10^2 - 2(5)(10) cos(180-32)
Note that we use 180-32 for the angle C because it is the supplement of angle B.
Simplifying, we get:
c^2 = 125 - 100cos(148)
Using a calculator, we find that cos(148) is approximately -0.6235. Plugging this in, we get:
c^2 = 187.35
Taking the square root, we get:
c = 13.68 nautical miles
Therefore, the vessel is approximately 13.68 nautical miles away from the port once it reaches the end of the journey.
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A square pyramid has a height of 4. 25 feet and a volume of 114. 75 cubic feet. What is the area of the base of the pyramid?
The area of the base of the pyramid is 81 square feet.
The formulation for the volume of a square pyramid is [tex]V = (1/3) * b^2 * h[/tex], in which" b" is the length of 1 aspect of the base and" h" is the height of the pyramid.
We are suitable to use this methodology to break for the length of one facet of the base, with a purpose to give us the area of the base.
[tex]114.75 = (1/3) * b^2 * 4.25[/tex]
Multiplying each sides by 3 gives
[tex]344.25 = b^2 * 4.25[/tex]
Dividing each angles by way of 4.25 gives
[tex]b^2 = 81[/tex]
Taking the square root of both angles gives
b = 9
Thus, the area of the base of the pyramid is
[tex]A = b^2 = 9^2 = 81[/tex] square feet.
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The following polgons are similar. Find the scale factor of the small figure to the large figure 3-4
The scale factor of dilation from the small figure to the large figure in the question are;
3. 1 : 4
4. 5 : 6
What is a scale factor of dilation?A scale factor is the ratio of the length of a side of an image (obtained from a preimage) to the length of the corresponding side of the preimage
The scale factor of the polygons obtained from diagrams are;
3. 4.5 yd to 18 yd = 1 to 4
The scale factor is 1 to 4
4. The ratio of the corresponding sides pairs of sides on the image and the preimage are;
Ratio on the large triangle; 42 : 18 = 7 : 3
Ratio on the small triangle; 35 : 15 = 7 : 3
The ratio of the pair of corresponding sides are equivalent, therefore, the triangles are similar.
The scale factor of the small triangle to the large triangle, obtained from the ratio of the corresponding sides is therefore;
35 : 42 = 5 : 6
15 : 18 = 5 : 6
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? That is how you write the answer.
All the possible values of x are given as follows:
26 < x < 28.
What is the condition for 3 lengths to represent a triangle?In a triangle, the sum of the lengths of the two smaller sides has to be greater than the length of the greater side.
If 27 is the greater side, we have that:
x + 1 > 27
x > 26.
If x is the greater side, we have that:
x < 27 + 1
x < 28.
Hence the interval of possible values is given as follows:
26 < x < 28.
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Let a(n) be a sequence defined recursively as follows: a(0) = -1 a(1) = 1 a(n+2) = a(n+1) - a(n). Find a(26)
For the given sequence a(26) = 2
To find a(26), we can use the recursive definition of the sequence and work our way up from a(0) and a(1):
a(0) = -1
a(1) = 1
a(2) = a(1) - a(0) = 1 - (-1) = 2
a(3) = a(2) - a(1) = 2 - 1 = 1
a(4) = a(3) - a(2) = 1 - 2 = -1
a(5) = a(4) - a(3) = -1 - 1 = -2
a(6) = a(5) - a(4) = -2 - (-1) = -1
a(7) = a(6) - a(5) = -1 - (-2) = 1
a(8) = a(7) - a(6) = 1 - (-1) = 2
From this pattern, we can see that the sequence repeats with a period of 6, so we can find a(26) by finding the remainder when 26 is divided by 6:
a(26) = a(26 mod 6) = a(2) = 2
Therefore, a(26) = 2.
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Show that Total SS = SST + SSB + SSE for a randomized block design, where b k SSE = b£j=l k£i=l (Yij-y•j-Yi•+Y)²
In a randomized block design, total variation in data is decomposed into three components: variation between blocks (SSB), variation between treatments within each block (SSE), and residual variation within each treatment and block combination (SST).
We can express the total sum of squares (Total SS) in a randomized block design as:
Total SS = SSB + SSE + SST
∑Yij² = SST + SSB + SSE and ∑Yij = bYi• + b∑y•j - bY
SSE = ∑(Yij - y•j - Yi• + Y)²
= ∑Yij² - 2∑Yijy•j - 2∑YijYi• + 2∑YijY + b∑y•j² + b∑Yi•² - 2bY∑y•j - 2bY∑Yi• + bY²
= SST + SSB + SSE - b∑y•j² - b∑Yi•² + 2bY∑y•j + 2bY∑Yi• - bY²
Rearranging and simplifying terms:
SSE = b∑y•j² + b∑Yi•² - 2bY∑y•j - 2bY∑Yi• + bY²
Multiplying both sides by k, the number of treatments:
kSSE = bk∑y•j² + bk∑Yi•² - 2bkY∑y•j - 2bkY∑Yi• + bkY²
Also, SST = ∑(Yij - Yi•)² and SSB = ∑(Yi• - Y)²
Therefore,
Total SS = SST + SSB + bk∑y•j² + bk∑Yi•² - 2bkY∑y•j - 2bkY∑Yi• + bkY²
Expanding the terms ∑Yi•² and ∑y•j² using the fact that ∑Yij² = SST + SSB + SSE:
Total SS = SST + SSB + bk(SST + SSB + SSE) - 2bkY∑y•j - 2bkY∑Yi• + bkY²
Simplifying the terms:
Total SS = bkSST + bkSSB + bkSSE - 2bkY∑y•j - 2bkY∑Yi• + bkY
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Bella is splitting her rectangular backyard into a garden in the shape of a trapezoid and a fish pond in the shape of a right triangle. What is the area of her garden?
A 6,000 units²
B 6,330 units²
C 6,660 units²
D 660 units²
The area of her garden is 6,330 units² (option b).
We know that the area of the trapezoid plus the area of the right triangle is equal to the area of the rectangle:
Area of trapezoid + Area of right triangle = L x W
We can substitute in the formulas we found earlier for the areas of the trapezoid and the right triangle:
(1/2) x hT x L + (1/2) x W x (L - hT) = L x W
Simplifying and solving for hT, we get:
hT = (2W - L) / 2
Now we can plug this value into the formula for the area of the trapezoid:
Area of trapezoid = (1/2) x hT x L
= (1/2) x [(2W - L) / 2] x L
= (W - L/2) x L
To find the area of the garden, we need to subtract the area of the fish pond (which is the area of the right triangle) from the area of the rectangle. We already found the formula for the area of the right triangle:
Area of right triangle = (1/2) x W x (L - hT)
So the area of the garden is:
Area of garden = L x W - Area of right triangle
= L x W - (1/2) x W x (L - hT)
Substituting in the formula we found earlier for hT, we get:
Area of garden = L x W - (1/2) x W x (L - (2W - L)/2)
= L x W - (1/2) x W x (W/2)
Simplifying, we get:
Area of garden = (3/4) x L x W
Now we can substitute in the values given in the problem to find the area of the garden:
L = 60 units
W = 110 units
Area of garden = (3/4) x L x W
= (3/4) x 60 x 110
= 6,330 units²
Hence option (b) is the right one.
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The Gaussian elimination rules are the same as the rules for the three basic row operations, in other words, you can algebraically act on a matrix's rows in the following three ways:
Interchanging two rows, for example, R2 ↔ R3
Multiplying a row by a constant, for example, R1 → kR1 where k is some nonzero number
Adding a row to another row, for example, R2 → R2 + 3R1
Yes, that is correct. The Gaussian elimination rules are essentially the same as the three basic row operations, which allow you to algebraically manipulate a matrix's rows.
You can interchange two rows, multiply a row by a constant, or add a row to another row. These rules are essential in solving systems of linear equations and finding the reduced row echelon form of a matrix. By applying these rules, you can transform a matrix into an equivalent matrix that is easier to work with and reveals important information about the system of equations or the matrix itself. The Gaussian elimination rules, also known as the three basic row operations, allow you to algebraically manipulate a matrix in order to solve systems of linear equations. These operations include:
1. Interchanging two rows (R2 ↔ R3)
2. Multiplying a row by a nonzero number (R1 → kR1, where k is a constant)
3. Adding a row to another row (R2 → R2 + 3R1)
These rules help simplify the matrix and ultimately obtain the unique solution for the system of equations.
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A spherical snowball is melting in such a way that its radius is decreasing at rate of 0.3 cm/min. at what rate is the volume of the snowball decreasing when the radius is 12 cm. (note the answer is a positive number).
The volume of the snowball is decreasing at a rate of approximately 5.4 cm³/min when the radius is 12 cm.
The formula for the volume of a sphere is V = (4/3)πr³, where V is the volume and r is the radius. To find the rate of change of the volume with respect to time, we need to take the derivative of this formula with respect to time. Using the chain rule, we get:
dV/dt = (4/3)π(3r²)(dr/dt)
where dV/dt is the rate of change of the volume with respect to time and dr/dt is the rate of change of the radius with respect to time.
Substituting the given values, we get:
dV/dt = (4/3)π(3(12)²)(-0.3)
= -241.9π cm³/min
Since the rate of change of volume cannot be negative, we take the absolute value of the result to get:
|dV/dt| = 241.9π cm³/min ≈ 759.8 cm³/min
Therefore, the volume of the snowball is decreasing at a rate of approximately 5.4 cm³/min when the radius is 12 cm.
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PLEASE ANSWER!!!! QUICK PLEASE!!!
A pair of standard dice are rolled. Find the probability of rolling a sum of 4 these dice
P(D1 + D2 = 4) --
Be sure to reduce
Answer:
There are three ways to roll a sum of 4: (1,3), (2,2), and (3,1). There are 36 possible outcomes when rolling two dice because each die has 6 possible outcomes, so we multiply the number of outcomes of each die: 6 x 6 = 36.
Therefore, the probability of rolling a sum of 4 with two standard dice is:
P(D1 + D2 = 4) = number of ways to roll a sum of 4 / total number of outcomes
P(D1 + D2 = 4) = 3 / 36
Simplifying the fraction, we get:
P(D1 + D2 = 4) = 1 / 12
Therefore, the probability of rolling a sum of 4 with two standard dice is 1/12 or approximately 0.083.
Step-by-step explanation:
in answer
Determine whether the following relation is a function or not and state the Domain and Range of the relation:
{(9,−5),(4,−3),(1,−1),(0,0),(1,1),(4,3),(9,5)}
No, The relation is not a function.
Domain = {9, 4, 1, 0}
Range = {-5, - 3, - 1, 0, 1, 3, 5}
We have to given that;
The relation is,
{(9,−5),(4,−3),(1,−1),(0,0),(1,1),(4,3),(9,5)}
We know that;
A relation between a set of inputs having one output each is called a function.
Here, Relation have;
(9, - 5) and (9, 5)
Thus, It does not satisfy the definition of function.
And, The value of domain of relation is,
Domain = {9, 4, 1, 0}
And, The value of range of relation is,
Range = {-5, - 3, - 1, 0, 1, 3, 5}
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A cone has a height of 15 feet and a diameter of 12 feet. What is its volume?
The volume of the cone is 180π cubic feet (or approximately 565.49 cubic feet if you evaluate π as 3.14159).
To calculate the volume of a cone, you can use the formula V = (1/3)πr^2h, where r is the radius of the base of the cone and h is its height.
Since the diameter of the cone is 12 feet, the radius is half of that, which is 6 feet. And the height is given as 15 feet.
Plugging these values into the formula of volume, we get:
V = (1/3)π[tex](6)^2[/tex](15)
V = (1/3)π(36)(15)
V = (1/3)(540π)
V = 180π
Thus, the answer is 180π.
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If H is the circumcenter of triangle BCD find each measure
We have found the measures of CD, CE, HD, GD, HG, and HF in triangle BCD, given that H is the circumcenter of the triangle.
In triangle BCD, the circumcenter H is the point where the perpendicular bisectors of the sides of the triangle intersect. This point is equidistant from the three vertices of the triangle.
Using the properties of the circumcenter, we can find the measures of various sides and angles of the triangle:
CD = 2FD, where FD is the foot of the perpendicular from H to CD.
CE = BE = 26, since H is equidistant from B and C.
HD = HC = 33, since H is equidistant from D and C.
GD = 1/2BD = 1/2(58) = 29, since H is equidistant from B and D.
HG = √HD² - GD² = √33² - 29² = 2√62 ≈ 15.75, using the Pythagorean theorem.
HF = √HD² - FD² = √33² - 32² = √65 ≈ 8.06, using the Pythagorean theorem.
Therefore, we have found the measures of CD, CE, HD, GD, HG, and HF in triangle BCD, given that H is the circumcenter of the triangle.
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The response time for ski patrol rescue responders is measured by the length of time from when the radio call is finished and when the responders locate the skier. Responders consider between 0 to 5 minutes as an ideal response time.
Supposing gathered data showed a Normal distribution with a mean of 6 minutes and standard deviation of 1. 2 minutes, what percent of responses is considered ideal? Round to the nearest whole percent
40% of responses are considered ideal, which means that the majority of responses fall outside of the ideal range of 0 to 5 minutes.
To calculate the percentage of responses that are considered ideal, we need to determine the proportion of responses that fall between 0 and 5 minutes. We can use the Normal distribution to solve this problem by calculating the z-score for 5 minutes and for 0 minutes, and then finding the area under the curve between those two z-scores.
The formula for calculating the z-score is (x - μ) / σ, where x is the observed value, μ is the mean, and σ is the standard deviation. For 5 minutes, the z-score is (5 - 6) / 1.2 = -0.83, and for 0 minutes, the z-score is (0 - 6) / 1.2 = -5.
We can use a standard Normal distribution table or a calculator to find the area under the curve between -5 and -0.83, which is approximately 0.3997. Multiplying this by 100 gives us 39.97%, which we round to 40%.
This suggests that ski patrol rescue responders may need to re-evaluate their response times and consider ways to improve their efficiency in order to increase the percentage of ideal responses.
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Compute the scalar constant k so that the functions x^2 + 2x, 3x^2 + kx are linearly independent (Hint: Use Wronskian)
The functions x^2 + 2x and 3x^2 + kx are linearly independent if k is not equal to 0 or 1.
We need to use the Wronskian to determine if the two functions x^2 + 2x and 3x^2 + kx are linearly independent. If the Wronskian is nonzero for all x, then the functions are linearly independent.
The Wronskian of two functions f(x) and g(x) is defined as:
W(f,g)(x) = f(x)g'(x) - g(x)f'(x)
Let's find the Wronskian of x^2 + 2x and 3x^2 + kx:
W(x^2 + 2x, 3x^2 + kx)(x) = (x^2 + 2x)(6x + k) - (3x^2 + kx)(2x + 2)
= 6x^3 + 2kx^2 + 12x^2 + 4kx - 6x^3 - 6kx - 6x^2 - 6x^2
= -2kx^2 + 2kx
We want the Wronskian to be nonzero for all x, which means that -2kx^2 + 2kx cannot be zero for any value of x, except possibly at x = 0. Therefore, we need to find the values of k that make -2kx^2 + 2kx = 0 only at x = 0.
Factoring out 2kx, we get:
-2kx(x - 1) = 0
This expression is equal to zero when x = 0 or x = 1. We want it to be zero only when x = 0, so we need to set the factor (x - 1) to a nonzero constant. This means k cannot be equal to zero or 1.
Therefore, the functions x^2 + 2x and 3x^2 + kx are linearly independent if k is not equal to 0 or 1.
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The length of a cell phone is
1.4
1.4 inches and the width is
3.4
3.4 inches. The company making the cell phone wants to make a new version whose length will be
1.54
1.54 inches. Assuming the side lengths in the new phone are proportional to the old phone, what will be the width of the new phone?
Answer:
The answer to your problem is, 2.04 inches
Step-by-step explanation:
We can assume that the width of the new phone is ‘ x ‘ inches
We know that [tex]\frac{x}{0.84} = \frac{3.4}{1.4}[/tex]
x = [tex]\frac{3.4}{1.4}[/tex] × 0.84
x = 2.04
Thus the answer to your problem is, 2.04 inches
If A and B are independent events with P(A) = 0.4 and P(B) = 0.25, then P(A È B) =
a. 0.65
b. 0.10
c. Not enough information is given to answer this question.
d. 0.55
If A and B are independent events with P(A) = 0.4 and P(B) = 0.25, then P(A È B) =The answer is d. 0.55.
Since A and B are independent events, we can use the formula for the probability of the union of two independent events: P(A ∪ B) = P(A) + P(B) - P(A)P(B). Given P(A) = 0.4 and P(B) = 0.25, we can calculate P(A ∪ B) as follows:
P(A ∪ B) = 0.4 + 0.25 - (0.4)(0.25) = 0.4 + 0.25 - 0.10 = 0.55
Or we can calculate as follows:
To find P(A È B), we use the formula: P(A È B) = P(A) + P(B) - P(A and B)
Since A and B are independent, P(A and B) = P(A) x P(B) = 0.4 x 0.25 = 0.1
Therefore, P(A È B) = 0.4 + 0.25 - 0.1 = 0.55.
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The height, h, of a falling object t seconds after it is dropped from a platform 400 feet above
the ground is modeled by the function h (t) = 400 - 16x². What is the average rate at
which the object falls during the first 3 seconds?
O 64
O 48
O-64
O-48
The average rate at which the object falls during the first 3 seconds is given as follows:
-48.
How to obtain the average rate of change?The average rate of change of a function is given by the change in the output of the function divided by the change in the input of the function.
The function for this problem is defined as follows:
h(x) = 400 - 16x².
The numeric values are given as follows:
h(0) = 400 - 16(0)² = 400.h(3) = 400 - 16(3)² = 256.Thus the average rate of change is obtained as follows:
r = (256 - 400)/(3 - 0)
r = -48.
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Complete the steps to solve the inequality:
0. 2(x + 20) – 3 > –7 – 6. 2x
Use the distributive property:
Combine like terms:
Use the addition property of inequality:
Use the subtraction property of inequality:
Use the division property of inequality:
0. 2x + 4 – 3 > –7 – 6. 2x
0. 2x + 1 > –7 – 6. 2x
6. 4x + 1 > –7
6. 4x > –8
and?
Solving the Inequality will give us x > -1.25
We have the inequality:-
0. 2(x + 20) – 3 > –7 – 6. 2x
Here we are given a set of instructions and need to use them to get the final answer.
First, we need to use the distributive property. Using that, we will eliminate the brackets to get
0.2x + (0.2 X 20) - 3 > - 7 - 6.2x
or, 0.2x + 4 - 3 > - 7 - 6.2x
Now, we need to combine the like terms. Here it would be 4 and -3. Hence we get
0.2x + 1 > - 7 - 6.2x
Next, we need to use the addition property of inequality, which states that for terms a, b, c
if a > b
then, a + c > b + c
Hence here we will add 6.2x to get
0.2x + 1 + 6.2x > - 7 - 6.2x + 6.2x
or, 6.4x + 1 > - 7
Similarly, applying the subtraction property of inequality states
if a > b
then, a - c > b - c
Here we need to subtract 1 to get
6.4x + 1 - 1 > - 7 - 1
or, 6.4x > - 8
Using the division property will give us
x > - 8/6.4
or, x > 1.25
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describe a statistical advantage of using the stratified random sample over a simple random sample in the context of thgis study
The use of a stratified random sample over a simple random sample provides a statistical advantage in ensuring that the sample accurately represents the population. Stratified random sampling involves dividing the population into subgroups or strata based on certain characteristics, such as age or income.
This allows for a more representative sample as it ensures that each stratum is represented proportionally in the sample. In contrast, a simple random sample does not take into account any characteristics or strata of the population, which may result in an unrepresentative sample. Therefore, the use of a stratified random sample provides a statistical advantage by reducing the potential for sampling bias and increasing the accuracy of the study's results.
In the context of your study, a statistical advantage of using a stratified random sample over a simple random sample is that it ensures greater representation and accuracy in the results.
In a stratified random sample, the population is first divided into distinct subgroups or strata based on specific characteristics, such as age, gender, or income. Then, a simple random sample is taken from each stratum. This method helps to better represent each subgroup in the sample, which in turn improves the overall accuracy of the results.
On the other hand, a simple random sample involves selecting individuals from the entire population without considering any specific characteristics. This approach may not adequately represent certain subgroups, leading to potential biases and less accurate results. In summary, stratified random sampling provides a statistical advantage over simple random sampling by ensuring a better representation of subgroups, leading to more accurate and reliable results.
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QUESTION 13 Let z denote a standard normal random variable. Find P(Z< -0.87)
The probability that the standard normal random variable z is less than -0.87 is approximately 0.1922.
To find the probability P(Z < -0.87) for a standard normal random variable or z-score, follow these steps:
1. Identify the given value: In this case, z = -0.87.
2. Look up the corresponding probability in a standard normal (Z) table or use a calculator or software with a built-in function for finding probabilities of standard normal random variables.
Using a standard normal table or software, you'll find that P(Z < -0.87) ≈ 0.1922. So, the probability that the standard normal random variable Z is less than -0.87 is approximately 0.1922.
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Rita has $2,276 in an account that earns 14% interest compounded annually.
To the nearest cent, how much interest will she earn in 5 years?
Answer:
$1,593
Step-by-step explanation:
I=PRT
I=$2,276×14%×5
I=1,593.2 to nearest tenth
I=$1,593
A car is 200 km from its destination after 1 hour and 80 km from its destination after 3 hours.
The car's speed is 60 km/hour.
Let's denote the distance from the starting point to the destination by D, and let's denote the car's speed by S.
Using the formula speed = distance / time.
S = d / t = (D - 200) / 1 ---- (1)
S = d / t = (D - 80) / 3 ----- (2)
We can simplify equation (2) by multiplying both sides by 3:
Expanding the right-hand side:
3S = D - 80
From equation 1 and 2:
3 (D - 200) = D - 80
3D - 600 = D - 80
3D - D = 600 - 80
2D = 520
D = 260
Therefore, the distance from the starting point to the destination is 260 km.
Using equation (1), we can find the car's speed:
S = 260 - 200 / 1
S = 60 m/s
Therefore, the car's speed is 60 km/hour.
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The complete question is:
A car is 200km from its destination after 1 hour and 80km from its destination after 3 hours. At what rate is the car traveling per hour?
Determine the equation of the circle graphed below.
The circle has a diameter of 10 and a radius of 5
the radius times itself ( 5 x 5 ) = 25
25 times pi (3.14) = 78.5
so the circle is 78.5, lets say square cm.
and the circumference is 31.41593 or 31.42
we need to find the center point and the length of the radius. The center point is at 5. 1. so h = 5 and k = 1
Now let’s count from the center to a point on the circumference to find the length of the radius. 5
The radius is 5 so r = 5
Now let’s plug everything into the standard form of a circle.
(x - h)²+ (y - k)² = r²
urses/ The general solution of the O.D.E y²q2 + y2 + 22 +1 = y' is: a. y=tan( x3/3+ x + c) b. y= tan -1 ( x3/3+x+ c) c. tan -1y2 = x3/3 + x + c d. Iny=x3/3+x+c
Answer: I think its 2x + c
Hope it helped :D
Let me know if I helped
Sorry if wrong
The general solution of the O.D.E y²q2 + y2 + 22 +1 = y' involves solving for y in terms of x and a constant, represented by "c". To do this, we can use the technique of separation of variables.
First, we rearrange the equation to isolate the derivative term on one side:
y²q2 + y² + 22 + 1 = y'
y²q2 + y² + 1 = y' - 2
(y²q2 + y² + 1)dy = dx
Next, we integrate both sides with respect to their respective variables:
∫(y²q2 + y² + 1)dy = ∫dx
y³/3 + y + y = x + c
y³ + 3y = 3x + c
At this point, we can use the trigonometric substitution u = tan(x/3 + c) to simplify the expression. Then, we can solve for y in terms of u:
u = tan(x/3 + c)
y = √(u² - 1/3)
Finally, we substitute back in the expression for u and simplify to obtain the general solution:
y = √(tan²(x/3 + c) - 1/3)
y = tan(x/3 + c)
Therefore, the answer is (a) y = tan(x/3 + c).
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