Answer:
Step-by-step explanation:
he correct answer for the domain of function p(x) is:
Domain: [1, ∞)
This means that x can take any value greater than or equal to 1, including 1 itself. The square root function (√x) is defined for non-negative real numbers, so x must be greater than or equal to 0. In this case, since we have √x - 1 in the function, x must be greater than or equal to 1 to avoid a negative value under the square root. Additionally, there are no other restrictions on the domain, so any value of x greater than or equal to 1 is allowed.
Max is designing a garden in his backyard. He is planning a
diagonal walkway through the garden. This diagram shows
the length & width of the planned garden. What is the length
of the diagonal walkway?
TRA
16 feet
12 feet
Applying the Pythagorean theorem, we can say that the length of the diagonal walkway that Max is designing is 20 feet.
How to calculate the length of the diagonal walkway?The first step is to understand that the design of the diagonal walkway forms a right triangle, so we can use the Pythagorean theorem, whose square of the length of the diagonal, also called the hypotenuse, will be equal to the sum of the squares on both sides.
Therefore, substituting the values in the formula C²=A²+B² where A corresponds to the width, B to the length and C as the diagonal, we have:
C²=12²+16²C²=144+256C²=400C= √400C= 20Find more about Pythagorean Theorem at:
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Urgent help please!!!
The equation of the circle with a center at (-4, 6) and a point on the circumference at (-2, 9) is (x + 4)² + (y - 6)² = 13.
Given:
Center of the circle: (-4, 6)
Point on the circumference: (-2, 9)
The center of the circle (h, k) is given as (-4, 6), which means h = -4 and k = 6.
The formula for the distance between the center and the point on the circumference can be used to determine the radius (r).
The formula for distance is provided by:
d = √((x₂ - x₁)² + (y₂ - y₁)²)
where (x₁, y₁) is the center (-4, 6), and (x₂, y₂) is the point on the circumference (-2, 9).
Putting in the values:
d = √((-2 - (-4))² + (9 - 6)²)
= √((2)² + (3)²)
= √(4 + 9)
= √13
So, the radius (r) is √13.
Now, we can substitute the values of h, k, and r into the general equation of the circle:
(x - h)² + (y - k)² = r²
(x - (-4))² + (y - 6)² = (√13)²
(x + 4)² + (y - 6)² = 13
Therefore, the equation of the circle is (x + 4)² + (y - 6)² = 13.
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8. The data in the table illustrate a linear function. x -3 0 3 6 y -5 -3 -1 1 What is the slope of the linear function? Which graph represents the data? mic 8-Y 0 X
Slope = 8/3
Given,
The table of linear function.
x : -3 , 0 , 3, 6
y : -5 , -3 , -1, 1
Slope = change in y over change in x
Slope = -3-(-5)/0 - (-3)
Slope = 8/3
Passing point = 0,-3
y-y1 = m (x - x1)
y-(-3) = 8/3(x - 0)
y + 3 = 8/3 x
y = 8/3 x -3
Hence, slope = 8/3 and linear function = y = 8/3 x -3
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Suppose that the distance of a car travels varies directly with the amount of gasoline it uses. A certain car uses 19 gallons of gasoline to travel 570 miles. How many miles can the car travel if it has 29 gallons of gasoline?
Help due! A S A P
Answer:
870 miles
Step-by-step explanation:
You want to know the number of miles that a car can travel on 29 gallons of gas if it travels 570 miles on 19 gallons, and the miles are proportional to the gallons.
ProportionIncreasing the number of gallons by a factor of 29/19 will increase the number of miles by that same factor. The car will be able to travel ...
(29/19)(570) = 870 . . . . miles
The car can travel 870 miles if it has 29 gallons of gas.
__
Additional comment
We could do this solving the equation ...
(570 mi)/(19 gal) = (x mi)/(29 gal)
Multiplying by 29 gal gives ...
x = (29/19)(570) = 870 . . . . . as above
<95141404393>
Two triangles can be formed using the given measurements. Solve both triangles.
A = 59°, a = 13, b = 14
The value of the angles are::
67.4°, C = 53.6°, c = 12.2; B = 112.6°, C = 8.4°, c = 2.2
Here, we have,
angle A = 59° and sides a = 13, b = 14.
Lets find remaining angles are B and C and the remaining side c.
Law of sines : a/sinA = b/sinB ⇒ sinB = (b*sinA)/a
sinB = (14*sin59o)/13 = (14*0.857167)/13 ≅ 0.923
B ≅ sin-1(0.923) ≅ 67.384.
There are two triangles, B₁ = 67.4 and B₂ = 180 - 67.4 = 112.6
find the angle c for B₁ = 67.4
A+ B +C = 180.
Angle C = 180 - (59 + 67.4) = 53.6.
Law of sines : b/sinB = c/sinC ⇒ c = b*sinC/sinB
c = (14)*sin(53.6)/sin(67.4) = (14)*(0.805)/(0.923) = 12.21.
now, we have,
find the angle c for B₂ = 112.6
A+ B +C = 180.
Angle C = 180 - (59 + 112.6) = 8.4.
Law of sines : b/sinB = c/sinC ⇒ c = b*sinC/sinB
c = (14)*sin(8.4)/sin(112.6) = (14)*(0.146)/(0.9232) = 2.27.
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More people leave Anytown, AL each year than move into it. The population over the past 20 years is shown in the table. Use technology to find an equation that models the exponential decline. Report the rate of decline below, rounding to the nearest hundredth.
Year Population
2000 30,000
2005 27,000
2010 25,500
2015 24,000
2020 22,400
The equation that models the exponential decline is y = 46348587109809610(0.9861)ˣ if the population over the past 20 years is provided.
Let's suppose the equation that models the exponential decline is: y=a(bˣ).
From the data given, we can calculate the value of a and b:
a = 46348587109809610
b = 0.9861
y = 46348587109809610(0.9861)ˣ
Therefore, the equation that models the exponential decline is y = 46348587109809610(0.9861)ˣ if the population over the past 20 years is provided.
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Please help me if you’re not sure please don’t answer
Step-by-step explanation:
7.4+8.59+9.66×3.14÷2=31.1562cm
Latasha split 36 cups of flour evenly into 39 cases. What decimal is
equivalent to the fraction of a cup of flour that was added to each
case?
Your answer may be exact or accurate to the nearest thousandth.
The decimal equivalent to the fraction of a cup of flour added to each case is approximately 0.923.
To find the decimal equivalent of the fraction of a cup of flour added to each case, we can divide the total amount of flour (36 cups) by the number of cases (39).
Decimal equivalent = Total amount of flour / Number of cases
Decimal equivalent = 36 cups / 39 cases
Calculating this division:
Decimal equivalent ≈ 0.923
Therefore, the decimal equivalent to the fraction of a cup of flour added to each case is approximately 0.923.
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You spin the spinner once. 789 What is P(9)? Write your answer as a fraction or whole number.
Answer:
Since there is only one 9 on the spinner, the probability of spinning a 9 is 1/3.
P(9) = 1/3
Find which case are appropriate with the given and look for the vertex, focus, opening of the graph, directrix, and latus rectum.
1. (x-3)^2 = 8(y-4)
2. y^2 = 4^2x
3. (y-2)^2 = 4(x-3)
The case are appropriate with the given:
(x-3)² = 8(y-4)
Vertex: (3, 4)Focus: (3, 6)Opening: UpwardDirectrix: y = 2Latus Rectum: 32 unitsy² = 4²x
Vertex: (0, 0)Focus: (1, 0)Opening: RightwardDirectrix: x = -1Latus Rectum: 16 units(y-2)² = 4(x-3)
Vertex: (3, 2)Focus: (4, 2)Opening: RightwardDirectrix: x = 2Latus Rectum: 16 unitsHow to determine appropriateness?Analyze each given equation to determine the appropriate case and find the vertex, focus, opening of the graph, directrix, and latus rectum.
1. (x-3)² = 8(y-4)
This equation represents a parabola with its vertex form given by (h, k) = (3, 4).
Case 1: The coefficient of (y - k) is positive, indicating an upward-opening parabola.
Vertex: The vertex is (3, 4).
Focus: The focus can be found using the formula (h, k + 1/4a), where a = coefficient of (y - k). In this case, the focus is (3, 4 + 1/4 × 8) = (3, 6).
Directrix: The directrix is a horizontal line located at y = k - 1/4a. In this case, the directrix is y = 4 - 1/4 × 8 = 2.
Latus Rectum: The latus rectum is the length of the chord passing through the focus and perpendicular to the axis of symmetry. In this case, it is equal to 4a = 4 × 8 = 32 units.
2. y² = 4²x
This equation represents a parabola with its vertex form given by (h, k) = (0, 0).
Case 2: The coefficient of x is positive, indicating a right-opening parabola.
Vertex: The vertex is (0, 0).
Focus: The focus can be found using the formula (h + 1/4a, k), where a = coefficient of x. In this case, the focus is (0 + 1/4 × 4, 0) = (1, 0).
Directrix: The directrix is a vertical line located at x = h - 1/4a. In this case, the directrix is x = 0 - 1/4 × 4 = -1.
Latus Rectum: The latus rectum is the length of the chord passing through the focus and perpendicular to the axis of symmetry. In this case, it is equal to 4a = 4 × 4 = 16 units.
3. (y-2)² = 4(x-3)
This equation represents a parabola with its vertex form given by (h, k) = (3, 2).
Case 3: The coefficient of (x - h) is positive, indicating a right-opening parabola.
Vertex: The vertex is (3, 2).
Focus: The focus can be found using the formula (h + 1/4a, k), where a = coefficient of (x - h). In this case, the focus is (3 + 1/4 × 4, 2) = (4, 2).
Directrix: The directrix is a vertical line located at x = h - 1/4a. In this case, the directrix is x = 3 - 1/4 × 4 = 2.
Latus Rectum: The latus rectum is the length of the chord passing through the focus and perpendicular to the axis of symmetry. In this case, it is equal to 4a = 4 × 4 = 16 units.
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What is the radius of a sphere with a volume of 32398 cm 3 ,to the nearest tenth of a centimeter?
The radius of a sphere with a volume of [tex]32398 cm^ 3[/tex] ,to the nearest tenth of a centimeter is [tex]r=21.1cm[/tex]
How can the radius of a sphere be calculated?A sphere is a geometrical object that resembles a two-dimensional circle in three dimensions. A sphere is formally defined as a collection of points in three-dimensional space that are all located at the same distance, or r, from a given point.
The formula for the volume of a sphere is [tex]V = 4/3 \pi r^3[/tex]
V = volume
r = radius
Given [tex]32398 cm^ 3[/tex]
[tex]V = 4/3 \pi r^3[/tex]
[tex]32398 = 4/3 \pi r^3[/tex]
[tex]r^3 = \frac{ 32398 }{\frac{4\pi }{3} }[/tex]
[tex]r = \sqrt[3]{9393.931}[/tex]
[tex]r=21.1cm[/tex]
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A function f is given, and the indicated transformations are applied to its graph. Write an equation for the
final transformed graph.
(4.1) f(x) = |x|; shrink vertically by a factor of (3)
1
2
, shift to the left 1 unit, and shift upward 3 units.
(4.2) f(x) = (2) √
x; reflect in the x−axis, shift 1 units upwards
(4.3) f(x) = (2) √
x; reflect in the y−axis, shift 2 units downw
The final transformed graphs are 1) f'(x) = (1/2)|x + 1| + 3, 2) f'(x) = -√x + 1 and 3) f'(x) = -√x - 2.
1. Break down the transformations step by step.
Start with the function f(x) = |x|.
a. Shrink vertically by a factor of 1/2: Multiply the function by 1/2.
g(x) = (1/2)|x|.
b. Shift to the left 1 unit: Replace x with (x + 1).
h(x) = (1/2)|x + 1|.
c. Shift upward 3 units: Add 3 to the function.
f'(x) = (1/2)|x + 1| + 3.
Therefore, the equation for the final transformed graph is f'(x) = (1/2)|x + 1| + 3.
2. Start with the function f(x) = √x.
a. Reflect in the x-axis: Multiply the function by -1.
g(x) = -√x.
b. Shift 1 unit upward: Add 1 to the function.
f'(x) = -√x + 1.
Therefore, the equation for the final transformed graph is f'(x) = -√x + 1.
3. Start with the function f(x) = √x.
a. Reflect in the y-axis: Multiply the function by -1.
g(x) = -√x.
b. Shift 2 units down: Subtract 2 from the function.
f'(x) = -√x - 2.
Therefore, the equation for the final transformed graph is f'(x) = -√x - 2.
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Find the value of the expression −a +b − −c if a =3, b = −6, and c=
−5
Answer:
-14
Step-by-step explanation:
You want to know the value of -a +b -(-c) when a=3, b=-6, c=-5.
Minus signsWe can simplify the given expression by recognizing that a double negative is a positive:
= -a +b +c
SubstitutionThe value is found by substituting the given numbers and doing the arithmetic:
= -(3) +(-6) +(-5)
= -3 -6 -5 = -(3 +6 +5) = -14
The value of the expression is -14.
__
Additional comment
Your calculator can help you find the value of a numeric expression.
<95141404393>
The value of the mathematical expression −a +b − −c with given values a =3, b = −6, and c= −5 is -4.
Explanation:The given mathematical expression is −a +b − −c. In this equation, we are given the values a =3, b = −6, and c= −5. We substitute these values into the equation to solve it. Thus, it becomes: -3 + (-6) - −(-5). When solved, -3 + (-6) +5 equals -4
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Use False-Position method to find a real root of f(x) = x3 - 2x - 5 = 0 correct to three decimal places. Please solution
The real roots of the function using false-position method are 1/2 and 5/8
What is the real root of the function?The real root of the function f(x) = x³ - 2x - 5 = 0 using the False-Position method can be calculated as;
1. Choose two initial guesses, a and b, such that f(a) and f(b) have opposite signs. In this case, we can choose a = 0 and b = 1.
[tex]c = \frac{(a * f(b) - b * f(a))}{(f(b) - f(a)}[/tex]
If f(c) = 0, then c is the root of the equation. Otherwise, replace a with b and b with c.
[tex]c = \frac{(0 * f(1) - 1 * f(0))}{(f(1) - f(0))} = \frac{1}{2}[/tex]
Since f(1/2) = -0.25, we can replace a with 1 and b with 1/2.
[tex]c = \frac{\frac{1}{2} * f(1) * f(\frac{1}{2}) }{(f(1) - f(\frac{1}{2}) } = \frac{5}{8}[/tex]
Since f(5/8) = 0.0625, we can stop here and say that the root of the equation is 5/8, which is approximately 0.625.
Where the roots of the equation are 1/2 and 5/8
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Abigail jogged 10.6 miles in 2.5 hours. What's her jogging speed in miles per hour?
A) 4.24 miles/hour
B) 4.32 miles/hour
C) 4 miles/hour
D) 5.3 miles/hour
Answer:
A) 4.24 miles/hour
Step-by-step explanation:
To find Abigail’s jogging speed in miles per hour, we need to divide the distance she jogged by the time it took her to jog that distance.
Therefore, Abigail’s jogging speed is 10.6 miles / 2.5 hours = 4.24 miles/hour.
Answer: A) 4.24 miles/hour
Step-by-step explanation:
The jogging speed can be calculated by dividing the total distance by the total time. So, to find Abigail's speed in miles per hour, we would divide the total miles (10.6) by the total hours (2.5).
10.6 miles ÷ 2.5 hours = 4.24 miles/hour
Therefore, the answer is:
A) 4.24 miles/hour
Directions: Only one of the multiple-choice answers below is correct. Identify the correct system
of expressions. Then, circle or highlight the incorrect element within each system you did not
choose.
A seafood restaurant sells two types of cooked fish; sole filet and sea bass. The restaurant sells
no less than 42 fish every day but it does not use more than 28 sole and no more than 40 bass.
The price of one sole fillet is $2.25 and that of bass serving is $17.00. Let x represent the number
of sole fillets purchased each day, and y represent the number of sea bass. The manager wants to
minimize the total price, p, of fish. Identify the objective function and the constraints that will
help the restaurant manager decide how many of each fish to buy.
(1) x ≥ 0, y ≥ 0, x+y≥ 42, x≤28, y ≥ 40, 17.00x +2.25y = z
(2) x ≥ 0, y ≥0,x+y≥ 40, x ≤ 28, y ≤ 42, 2.25x + 17.00y=z
(3) x ≥ 0, y ≥0, x+y≥ 42, x≤ 28, y ≤ 40, 2.25x + 17.00y = z
(4) x ≥ 0, y ≥ 0, x+y≥ 42, x ≤ 28, y < 40, 2.25x + 17.00y > z
(5) x ≥ 0, y ≥0,x+y> 42, x≤ 40, y ≤ 28, 2.25x + 17.00y = z
***
than solid colo
tie-dye and they want to decide how
The correct system of expressions is (3) x ≥ 0, y ≥ 0, x+y ≥ 42, x ≤ 28, y ≤ 40, 2.25x + 17.00y = z
The interest accrued on a certificate of deposit (CD) can be compounded quarterly by using the following formula:
P(1 + r/n)nt = A
Where:
The total of the accrued interest and principle is denoted by the letter A.
P denotes the principle of the initial investment.
The yearly interest rate is expressed in decimals as r.
n is the number of interest compoundings every year.
t is the age in years.
Celine Hocking invests $3,500 at a 4.5% annual interest rate with quarterly compounding in this case. Let's calculate the interest after one year:
Given in decimal form, 0.045 is equal to P = $3,500 and r = 4.5%.
(Quatrio-annual compounding) t = 1 (1 year), and n = 4.
A = 3500(1 + 0.045/4)^(4*1)
A = 3500(1 + 0.01125)^4 A = 3500(1.01125)^4 A ≈ 3500(1.045564)
A ≈ $3,668.47
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Mrs Tilmos creates a new Garden in her yard in the shape of a triangle. one side of the garden measures 13 ft and is perpendicular to a second side which is twice as long. before she plants her flowers, she wants to mic a fertilizer into the soil, whose D
directions say to use one cup per every 20 square feet? how many cups of fertilizer should she use? enter your answer as a decimal, rounded to the nearest half cup
Mrs. Tilmos should use 8 1/2 cups of fertilizer for her triangle garden.
To answer the question, we must first calculate the area of Mrs. Tilmos' triangle garden. We can do this using the equation for the area of a triangle (A=1/2 × b × h). In this equation, b is the base and h is the height.
For this garden, the base (b) is 13 feet and the height (h) is twice the base, so h=2 × b or h=26 feet. Using the equation, we can calculate that the area of the garden is:
A = 1/2 × b × h
A = 1/2 × 13 × 26
A = 169 square feet
Now that we have the area of the garden, we can calculate how many cups of fertilizer to use. We know that the fertilizer's directions say to use 1 cup per every 20 square feet, so we have to divide 169 by 20.
169 / 20 = 8.45
We can round this result up to 8 1/2 cups of fertilizer to use.
Therefore, Mrs. Tilmos should use 8 1/2 cups of fertilizer for her triangle garden.
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Start with the top figure. Which transformation was used to create the pattern?
translation
rotation
reflection
glide reflection
The transformation used to create the pattern in the top figure is reflection.
A reflection is a transformation that flips an object over a line, called the line of reflection. It produces a mirror image of the original object. In the case of the pattern in the top figure, we can observe that the pattern is symmetric about a specific line of reflection.
To determine if a reflection was used, we examine the pattern for mirror symmetry. Mirror symmetry means that one half of the pattern is a reflection of the other half. In the top figure, if we were to fold the pattern along a vertical line, the two halves would align perfectly, indicating mirror symmetry.
This mirror symmetry suggests that a reflection has been applied to create the pattern. Each shape in the pattern appears to have been reflected across the line of reflection to create its corresponding mirrored shape.
Other transformations such as translation, rotation, and glide reflection do not exhibit the same mirror symmetry as a reflection. A translation involves shifting an object without changing its orientation, a rotation involves rotating an object around a fixed point, and a glide reflection is a combination of a translation and a reflection.
In conclusion, based on the mirror symmetry observed in the top figure's pattern, the transformation used to create the pattern is a reflection.
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Solve the inequality for x
5 3/2 x 2 1/3
Answer:
A
Step-by-step explanation:
5 - [tex]\frac{3}{2}[/tex] x ≥ [tex]\frac{1}{3}[/tex]
multiply through by 6 ( the LCM of 2 and 3 ) to clear the fractions
30 - 9x ≥ 2 ( subtract 30 from both sides )
- 9x ≥ - 28
divide both sides by - 9 , reversing the symbol as a result of dividing by a negative quantity.
x ≤ [tex]\frac{28}{9}[/tex]
42. Using Chord-Chord theorem, what is the value of x?
5
10
2
The length of segment x in the two intersecting chords is determined as 4.
What is the value of x?The value of segment x is calculated by applying intersecting chord theorem, which states that the angle at tangent is half of the arc angle of the two intersecting chords.
Also this theory states that the product of two segments of a chord is equal to the product of the two segments of second intersecting chord in a circle.
From the diagram, we can set up the following equations and solve for length x;
5 (x) = 10(2)
5x = 20
x = 20/5
x = 4
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Find the average rate of change of g(x) = x over the interval
[-9, -2].
Write your answer as an integer, fraction, or decimal rounded to
nearest tenth. Simplify any fractions.
The average rate of change of [tex]\(g(x) = x\)[/tex] over the interval [tex]\([-9, -2]\) is 1.[/tex]
To find the average rate of change of a function over an interval, we calculate the difference in the function values at the endpoints of the interval and divide it by the difference in the corresponding x-values.
In this case, the function [tex]\(g(x) = x\)[/tex] and the interval is [tex]\([-9, -2]\)[/tex]. We can determine the average rate of change as follows:
[tex]\[ \text{Average rate of change} = \frac{g(-2) - g(-9)}{-2 - (-9)} \][/tex]
By substituting the function values, we get:
[tex]\[ \text{Average rate of change} = \frac{-2 - (-9)}{-2 - (-9)} \][/tex]
Simplifying the numerator and denominator, we have:
[tex]\[ \text{Average rate of change} = \frac{7}{7} = 1 \][/tex]
Therefore, the average rate of change of [tex]\(g(x) = x\)[/tex] over the interval [tex]\([-9, -2]\)[/tex] is [tex]1[/tex].
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0.045 × 2.05 /0.0025 leaving your answer in standard form
The value of 0.045 × 2.05 / 0.0025 in standard form is 3.69 × 10.
To perform the calculation and express the answer in standard form, follow these steps:
Multiply 0.045 by 2.05:
0.045 × 2.05 = 0.09225
Divide the result by 0.0025:
0.09225 / 0.0025
= 36.9
Convert the answer to standard form by writing it as a decimal multiplied by a power of 10:
36.9 = 3.69 × 10
Therefore, the value of 0.045 × 2.05 / 0.0025 in standard form is 3.69 × 10.
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In.a two - digit number, the units digit is twice the tens digit. If the number is doubled, it will be 12 more than the number reversed. Find the number
The number is 48.
Let's represent the two-digit number as 10x + y, where x is the tens digit and y is the units digit.
According to the given information, the units digit is twice the tens digit. So we have the equation:
y = 2x
If the number is doubled, it will be 12 more than the number reversed. When we double the number, we get 2(10x + y), and the number reversed is 10y + x.
Therefore, we can write the equation as:
2(10x + y) = 10y + x + 12
Simplifying this equation, we get:
20x + 2y = 10y + x + 12
19x = 8y + 12
19x - 8y = 12
We have two equations now:
y = 2x
19x - 8y = 12
Substituting the value of y from the first equation into the second equation, we get:
19x - 8(2x) = 12
19x - 16x = 12
3x = 12
x = 4
Now we can substitute the value of x back into the first equation to find y:
y = 2x
y = 2(4)
y = 8
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100 Points! Algebra question. Photo attached. Please show as much work as possible. Thank you!
Answer:
Step-by-step explanation:
Ok so, as given in the table, the cost of the 3rd tank is 800$, we can thus determine the cost of 1 cubic inch for a tank and use that to determine the cost of the other tanks.
[tex]volume =L\times W\times H\\=24\times 24\times 24\\=13824 in^3[/tex]
thus, to compute the cost of one cubic inch, we can divide the cost by the volume of the 3rd tank (in cubic inches)
[tex]\frac{800}{13824}=0.0579[/tex] [tex]usd/in^3[/tex]
now, we can determine the dimensions of the second tank that will make it cost 150$
[tex]0.0579\times 18\times W\times 24=150[/tex]
[tex]W=\frac{150}{0.0579\times 18\times 24} =6 in.[/tex]
Now to determine the cost of the first tank, we can multiply its volume by the cost per cubic inch:
[tex]cost=0.0579\times36\times 36\times 36=2700[/tex]$
As of question B, the cost will increase as the width increases.
For Question C, we can find the volume of the sphere by the formula:
[tex]volume=\frac{4}{3}\pi r^3 =\frac{4}{3}\pi \times 24^3=57905 in^3[/tex]
To find the cost of that tank, we just multiply its volume by the cost per unit volume:
[tex]cost=57905\times 0.0579=3352[/tex]$ (roughly)
Determine the general solution of 6 sin² x+7cos x-3=0
Answer:
x = 2nπ ± π/3 or x = 2nπ ± cos⁻¹(3/4)
What is the intermediate step in the form (x+a)^2=b(x+a)
2
=b as a result of completing the square for the following equation?
x^2+22x=8x-53
By completing squares we will get the expression:
(x + 7)² = -4
How to complete squares in a quadratic equation?Here we have the quadratic equation:
x² + 22x = 8x - 53
First, move all the terms to the left side, then we will get:
x² + 22x - 8x + 53 = 0
x² + 14x + 53 =0
Now, remember the perfect square trinomial:
(a + b)² = a² + 2ab + b²
Then we can rewrite our expression as:
x² + 2*7*x + 53 =0
Now we can add and subtract 7², then we will get.
x² + 2*7*x + 7² - 7² + 53 =0
(x + 7)² - 7² + 53 = 0
(x + 7)² - 49 + 53 = 0
(x + 7)² + 4 = 0
(x + 7)² = -4
That is the expression we wanted.
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A triangle has vertices A(-4, 0),
B(4, 8), and C(8, - 12), and the following is true
Angle A " B" C " = D 3/2(D 1/2
(Angle ABC)
What is the perimeter of Angle
A" B"C"?
The perimeter of triangle A"B"C" is found as 43.78.
How do we calculate?
We first determine length of each side:
The distance formula has that :
AB = √[(4 - (-4))² + (8 - 0)²]
= √128
= 8√2
BC = √[(8 - 4)² + (-12 - 8)²]
= √320
= 8√5
CA = √[(-4 - 8)² + (0 - (-12))^²]
= √320
= 8√5
cos(ABC) = (AB² + BC² - CA²) / (2 * AB * BC)
cos(ABC) = (128 + 320 - 320) / (2 * 8√2 * 8√5)
cos(ABC) = 1 / (4√2)
ABC = [tex]cos^{-1}[/tex](1 / (4√2))
ABC = 78.46°
A"B" = AB = 8√2
B"C" = BC = 8√5
C"A" = CA = 8√5
We then find the perimeter of triangle A"B"C" is:
A"B" + B"C" + C"A"
= 8√2 + 8√5 + 8√5
= 8√2 + 16√5
= 43.78
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Patient’s wt: 60 lb Medication order: 0.5 mg/kg Stock medication: 10 mg/mL
1. The weight of the patient in kilograms is 27.216 kg. (60 lb * 0.4536 kg/lb = 27.216 kg)
2. The total dosage of medication required for the patient is 13.608 mg. [tex](0.5 mg/kg \times 27.216 kg = 13.608 mg)[/tex]
3. The patient should be administered 1.3608 mL of the stock medication. (13.608 mg / 10 mg/mL = 1.3608 mL)
To calculate the necessary values based on the given information, let's follow the steps below:
Determine the weight of the patient in kilograms:
Given that the patient weighs 60 lb, we can convert this to kilograms using the conversion factor of 1 lb = 0.4536 kg.
Weight (in kg)[tex]= 60 lb \times 0.4536 kg/lb = 27.216 kg.[/tex]
Calculate the total dosage of medication required for the patient:
The medication order is 0.5 mg/kg, and the patient weighs 27.216 kg.
Total dosage [tex]= 0.5 mg/kg \times 27.216 kg = 13.608 mg.[/tex]
Determine the amount of stock medication required in milliliters (mL):
The stock medication is available in a concentration of 10 mg/mL.
To find the volume required, we need to divide the total dosage by the concentration of the stock medication.
Volume (in mL) = Total dosage (in mg) / Concentration (in mg/mL) = 13.608 mg / 10 mg/mL = 1.3608 mL.
Therefore, based on the given information, the weight of the patient is 27.216 kilograms, the total dosage of medication required is 13.608 milligrams, and 1.3608 milliliters of the stock medication should be administered to the patient.
Please note that when administering medication, it is crucial to follow the guidance of a healthcare professional and consider other factors such as the specific medication instructions, patient's condition, and any allergies or contraindications.
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Question: A patient weighs 60 lb, and the medication order is 0.5 mg/kg. The stock medication is available in a concentration of 10 mg/mL.
Based on this information, calculate the following
What is the weight of the patient in kilograms? (1 lb = 0.4536 kg)
What is the total dosage of medication required for the patient?
How many milliliters (mL) of the stock medication should be administered to the patient?
Please provide the necessary calculations and steps to find the answers based on the given information.
write an equation of the line that passes through the points (0,-2),(3,13)
Answer: y = 5x-2
Step-by-step explanation:
A model rocket is launched from ground level. It’s flight path is modeled by the following equation Y= -16t^2+160t where h is the height of the rocket above the ground in feet and t is the time after the launch in seconds. what is the rocket’s maximum height? when did the rocket reach the maximum height?
The rocket's maximum height is 800 feet. It reached its maximum height at 5 seconds after launch.
To solve this problem, we need to find the vertex of the parabola represented by the equation Y= -16t^2+160t. The vertex of a parabola is the point where the parabola changes direction, from increasing to decreasing or vice versa.
The vertex of the parabola is given by the following formula:
(-b/2a, c - b^2/4a)
In this case, the value of b is 160 and the value of a is -16. Plugging these values into the formula, we get the following:
(-160/2(-16), 800 - 160^2/4(-16))
(5, 800)
Therefore, the rocket reached its maximum height at 5 seconds after launch. The maximum height is 800 feet.