The amount of tin was used to make the can of cylindrical can is 478 cm²
What is an equation?An equation is an expression that shows the relationship between numbers and variables.
Area is the amount of space occupied by a figure. Area is usually calculated for a two dimensional shape while volume is calculated for a three dimensional shape.
The surface area of cylindrical can = 2π(radius * height + radius²)
From the image:
radius = 9 cm/2 = 4.5 cm, height = 12.4 cm
Hence, substituting:
The surface area of cylindrical can = 2(3.14)(4.5 * 12.4 + 4.5²) = 478 cm²
The surface area of cylindrical can is 478 cm²
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Use the information below to find the value of x. Explain your steps.
I need an answer to this question by Tuesday,
(x+5)^2 ; x=-2 and y=1
Answer:
9
Step-by-step explanation:
(-2+5)^2
3^2
9
find the volume common to two spheres, each with radius r, if the center of each sphere lies on the surface of the other sphere.
The volume of the common region between two spheres, each with radius r, is 4/3π(r^3 - 32r^6).
The volume common to two spheres, each with radius r, is given by the equation V = 4/3πr3.
The volume of the common region between two spheres, each with radius r, is given by the formula:
V = 4/3π(r^3 - (r^2 - d^2)^3/2),
where d is the distance between the centers of the spheres.
In this case, the distance between the centers is 2r, since the center of each sphere lies on the surface of the other sphere.
Thus, the volume of the common region is 4/3π(r^3 - (r^2 - (2r)^2)^3/2)
= 4/3π(r^3 - (r^2 - 4r^2)^3/2)
= 4/3π(r^3 - (r^2 - 4r^2)^3/2)
= 4/3π(r^3 - (4r^2)^3/2)
= 4/3π(r^3 - 64r^6/2)
= 4/3π(r^3 - 32r^6)
= 4/3π(r^3 - 32r^6)
= 4/3π(r^3 - 32r^6).
Therefore, the volume of the common region between two spheres, each with radius r, is 4/3π(r^3 - 32r^6).
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Complete question : What is the volume common to two spheres, each with radius r, if the center of each sphere lies on the surface of the other sphere?
1. You are the manager of a small store that specializes in hats, sunglasses, and other accessories. You are considering a sales promotion of a new line of hats and sunglasses. You will offer the sunglasses only to those who purchase two or more hats, so you will sell at least twice as many hats as pairs of sunglasses. Moreover, your supplier tells you that, due to seasonal demand, your order of sunglasses cannot exceed 100 pairs. To ensure that the sale items fill out the large display you have set aside, you estimate that you should order at least 210 items in all. Assume that you will lose $3 on every hat and $2 on every pair of sunglasses sold. Given the constraints above, how many hats and pairs of sunglasses should you order to lose the least amount of money in the sales promotion? [Using Graphic method]
To lose the least amount of money in the sales promotion, you should order the minimum number of hats and pairs of sunglasses while still satisfying the constraints given.
Let x be the number of hats you order and y be the number of pairs of sunglasses you order.
From the information given, we can set up the following constraints:
y = 2x (because you will sell at least twice as many hats as pairs of sunglasses)
y <= 100 (because your supplier tells you that your order of sunglasses cannot exceed 100 pairs)
x + y >= 210 (because you estimate that you should order at least 210 items in all)
We also know that you will lose $3 on every hat and $2 on every pair of sunglasses sold. So the objective is to minimize the cost:
Cost = 3x + 2y
Now we can use the constraints to set up a linear optimization problem. We can use a solver to minimize the cost and find the optimal values of x and y that meet the constraints.
Solving the problem gives us x = 140, and y = 280, so you should order 140 hats and 280 pairs of sunglasses to lose the least amount of money in the sales promotion.
You are going to conduct coin toss experiment using fair; evenly balanced coin. Answer the following questions regarding your experiment: Hint: You may find it valuable to write out the sample space of the experiment: What is the probability of tossing "heads" on your first coin toss? 0.50 What is the probability of tossing "heads" on each of your first two tosses?
The probability of tossing "heads" on each of your first two tosses is 0.25
Probability = n(E)/n(S)
Where E is the possibility of an event occurring
and S is the sample space i.e., the total number of possible outcomes.
Probability is the measure of how likely an event can happen. The probability of any event lies between 0 and 1 only.
The sample space for when you toss one coin is - H, T
So the probability to get an H is= 1/2
=0.5
Similarly, The sample space for when you toss two coins is HH, TT, HT, TH
So, the probability to get an H on each of your first two tosses is = 1/4
=0.25
Therefore, The probability of tossing "heads" on each of your first two tosses is 0.25
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Match the given differential equation with one or more of the solutions. (Select all that apply.)
xy'' ? y' = 0
y=0
y=2x
y=2x^2
y=2
The solutions that match the given differential equation are a)y=0 and b)y=2x.
The differential equation is a homogeneous linear differential equation with constant coefficients, which can be written in the form of y" + p(x)y' + q(x)y = 0. The general solution to this type of equation is y = c1e^(rx) + c2e^(rx) where r is the root of the characteristic equation r^2 + p(x)r + q(x) = 0.
In this case, the equation is of the form xy'' - y' = 0. By dividing both sides by x, we get y'' - (1/x)y' = 0, which is a homogeneous linear differential equation with constant coefficients. The characteristic equation is r^2 - (1/x)r = 0. The roots of this equation are r1 = 0 and r2 = 1/x.
Therefore, the general solution to this differential equation is y = c1 + c2x.
y=0 is a solution of the differential equation since it satisfies the equation when plugged in.
y=2x is also a solution of the differential equation since it also satisfies the equation when plugged in.
y=2x^2 and y=2 are not solutions of the differential equation because when plugged into the equation they don't satisfy it.
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True/False: If the angular diameter of an observed object can be measured and its distance is known, its true physical diameter can be calculated.
If the angular diameter of an observed object can be measured and its distance is known, its true physical diameter can be calculated, and the given statement is TRUE.
An angular distance describes how large a sphere or circle appears from a given point of view.
The angular diameter is calculated as:
Angular Diameter=206265X(Actual diameter/Distance)
The angular diameter of an object is the angle the object makes as seen by an observer. This is demonstrated in the diagram below, where the angular diameter of the object appears larger to an observer at A than to an observer at B.
Angular diameter can also refer to the distances between two objects, measured on the celestial sphere.
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solve the system using either gaussian elimination with back-substitution or gauss-jordan elimination. (if there is no solution, enter no solution. if the system has an infinite number of solutions, express x, y, and z in terms of the parameter t.) 3x 3y 12z
So, the solution is x = 1, y = -1, z = 3.
One way to solve the system is using Gaussian elimination with back-substitution. The steps are:
1. Rewrite the system in matrix form, called the augmented matrix:
[3 3 6 | 9]
[1 1 2 | 3]
[2 5 10| 15]
[-1 2 4 | 6]
2. Perform row operations to convert the matrix to an upper triangular matrix.
[1 1 2 | 3]
[0 2 4 | 3]
[0 2 6 | 6]
[0 0 -2 | -6]
3. Use back-substitution to find the values of the variables. Starting with the last equation:
-2z = -6 => z = 3
4y + 6(3) = 6 => y = -1
x + 2(-1) + 2(3) = 3 => x = 1
So, the solution is x = 1, y = -1, z = 3.
Another way is Gauss-Jordan elimination, it's similar with Gaussian elimination but it will change the matrix to a row echelon matrix and then to a reduced row echelon matrix.
So, the solution is x = 1, y = -1, z = 3.
Complete Question: solve the system using either gaussian elimination with back-substitution or gauss-jordan elimination. (if there is no solution, enter no solution. if the system has an infinite number of solutions, express x, y, and z in terms of the parameter t.) 3x + 3y + 6z = 9
x + y + 2z = 3
2x + 5y + 10z = 15
−x + 2y + 4z = 6
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What is the answer to this?
a line segment that connects the center of the circle to any point on the circle
Magan went shopping for a new camera because of a sale. The price on the tag was $21, but Magan paid $12.60 before tax. Find the percent discount.
Answer:
40%
Step-by-step explanation:
To find the percent discount, take the original price and subtract the discounted price.
21 - 12.60=8.4
Divide this by the original price.
8.4/21 = .4
Change this to percent form.
.4 = 40%
Answer:
8.4
Step-by-step explanation:
The price of a bag = 21
Magan paid 12.60
00. 21
12.00
- - - - - - - - -
8.4
how many integers greater than 5400 have both of the following properties? (a) the digits are distinct. (b) the digits 2 and 7 do not occur.
There are 15120 integers greater than 5400 that have distinct digits and do not contain 2 and 7.
The number of required integers is the number of integers greater than 5400 which have distinct digits and do not contain 2 and 7. This can be calculated with the formula:
Number of Required Integers = (9 * 8 * 7 * 6 * 5 * 4 * 3 * 2 * 1) - (2 * 8 * 7 * 6 * 5 * 4 * 3 * 2 * 1) = 30240 - 15120 = 15120.
This is because for the first part of the equation, we must calculate the total number of possible permutations of distinct digits from 0-9 (9 * 8 * 7 * 6 * 5 * 4 * 3 * 2 * 1). For the second part, we must calculate the number of permutations of digits from 0-9 excluding 2 and 7 (2 * 8 * 7 * 6 * 5 * 4 * 3 * 2 * 1). We then subtract the second part from the first to get the required answer.
Therefore, there are 15120 integers greater than 5400 that have distinct digits and do not contain 2 and 7.
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1/2n = 1/4n - 3n+3/2n
Solve
Also check for extraneous solutions
Answer: 1/2n = 1/4n - 3n+3/2n
Start by multiplying both sides by 2n to get rid of the fractions:
1 = 1/2 - 3n+3/n
Then by multiplying both sides by n to get rid of the fraction on the right side:
n = -3n+3
Then by adding 3n to both sides:
4n = 3
Then by dividing both sides by 4:
n = 3/4
There is no extraneous solutions in this case, because no denominators are equal to zero and all the operations are valid. Therefore, the solution is n = 3/4
Step-by-step explanation:
At a point on the ground 80 ft from the base of a tree, the distance to the top of the tree is 11 ft more than 2 times
the height of the tree. Find the
height of the tree.
The height of the tree is I f
(Simplify your answer. Round to the nearest foot as needed.)
The height of the tree is 39 ft from the ground.
What is Pythagorean Theorem?In a right-angled triangle, the square of the hypotenuse side is equal to the sum of the squares of the other two sides, according to Pythagoras's Theorem. These triangle's three sides are known as the Perpendicular, Base, and Hypotenuse.
Let us suppose the height of the tree = l
The distance from the point on the ground to the top of the tree is thus:
h = 11 + 2(l)
Given that the base = 80 ft.
To find the height of the tree we can use the Pythagorean theorem.
The Pythagorean theorem is given as follows:
a^2 + b^2 = c^2
(80)^2 + (l)^2 = (11 + 2l)^2
Using the identity (a + b) ^2 = a^2 + 2ab + b^2 we can write the equation as:
6400 + l^2 = 121 + 44l + 4l^2
Take all the terms on a single side of the equation:
4l^2 - l^2 + 44l + 121 - 6400= 0
3l^2 + 44l - 6279 = 0
Solve the following quadratic equation using the equation of the quadratic function:
l = 39
Hence, the height of the tree is 39 feet.
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the green (upper) triangle has an area of . the purple (lower) triangle has an area of . place the orange triangle (square symbols) directly next to the green triangle so that the two triangles together make a rectangle. the total area of this rectangle is , which is the area of the green triangle.
The green triangle has an area of 6 sq units. The purple triangle has an area of 6 sq units. If the orange triangle is placed directly next to the green triangle such that the two triangles together make a rectangle, the total area of this rectangle is 12 sq units, which is half the area of the green triangle.
We know that the area of a triangle is given by
1/2 X Base X height
Now, for the green triangle, the area will be
1/2 X (5 - 1) X (9 - 6)
= 1/2 X 4 X 3 sq units
= 6 sq units
The distance between the highest vertex and the base's y coordinates for the purple triangle will make up the height. hence we get
1/2 X (9 - 5) X (4 - 1)
= 1/2 X 4 X 3 sq units
= 6 sq units
Now if the orange triangle is placed on the graph in such a way that it makes a rectangle with the green one, the length and width of the rectangle will be the same as the base and height of the triangle
Hence the area of the rectangle will be
4 X 3 sq units
= 12 sq units
We can see that it is double the area of the purple triangle.
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please help me with this math
PART 1: The solution of the inequality is x < 3.5 and the second graph shows the solution.
PART 2: The inequality she solved is (2/5)x - 4/5 ≤ 1 1/5.
How to solve inequality?An inequality compares two values, showing if one is less than, greater than, or simply not equal to another value e.g. 5 < 6, x ≥ 2, etc.
PART 1
First, solve for x in 9.5x -1.25 < 32
9.5x -1.25 < 32
9.5x < 32 + 1.25
9.5x < 33.25
x < 33.25/9.5
x < 3.5
Since x < 3.5, the circle of the graph will not be shaded. Thus, the second graph is the graph of x < 3.5.
PART 2
The graph of the inequality shown there is x ≤ 5. Thus, any inequality which when solved will give x ≤ 5 will be the inequality that represent the graph.
Let's try (1/5)x - 3/5 ≤ 1/5 and see:
(1/5)x - 3/5 ≤ 1/5
(1/5)x ≤ 1/5 + 3/5
(1/5)x ≤ 4/5
x ≤ 4
This is not the inequality
Let's try (2/5)x - 4/5 ≤ 1 1/5:
(2/5)x - 4/5 ≤ 1 1/5
(2/5)x - 4/5 ≤ 6/5
(2/5)x ≤ 6/5 + 4/5
(2/5)x ≤ 2
2x ≤ 10
x ≤ 5
This is the inequality
Thus, she solved (2/5)x - 4/5 ≤ 1 1/5
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A scientist uses a submarine to study ocean life. She begins at sea level, which is an elevation of 0 feet. She descends 21.4 feet. She then travels directly up 5.8 feet. Next, she descends a second time, 36.2 feet. How many feet must she now rise to get back to sea level?
Find the point on the curve y = -x^2 - 2 that is closest to the point (0, 1). A. (0, 0) B. (0, -2) C. (1, -3) D. (-1, -3)
Answer:
the answer is B (0, -2)
Step-by-step explanation:
To find the point on the curve y = -x^2 - 2 that is closest to the point (0,1), we can use the method of least squares.
The method of least squares involves finding the point on the curve that minimizes the square of the distance between the point and the curve.
To begin, we can define a function d(x) = (y - (-x^2 - 2))^2 which represents the square of the distance between the point (x,y) on the curve and the point (0,1)
then we need to find the derivative of d(x) and set it to zero to find the minimum,
d'(x) = 2(y + x^2 + 2 - 1) = 2(y + x^2 + 1)
by setting d'(x) = 0 we get y = -x^2 - 1,
so the point on the curve that is closest to (0,1) is (0, -1) and the answer is B (0, -2)
Note that the point (0,-1) is on the curve y = -x^2 - 2 but not the point on the closest.
Solve the system of equations: 3 � - � = 17 5 � + 3 � = 5 (-4, 5) (4, -5) (-4, -5) (4, 5)
Answer: To solve the system of equations, we can use the substitution method. We'll start by isolating one of the variables in one of the equations.
The first equation is 3x - 2y = 17
We can solve for x by adding 2y to both sides:
3x = 17 + 2y
x = (17 + 2y)/3
We can substitute this expression for x into the second equation:
5((17 + 2y)/3) + 3y = 5
Simplifying, we get:
50 + 10y + 3y = 5
13y = -45
y = -3.5
Now we can substitute this value of y into the equation we found earlier for x:
x = (17 + 2(-3.5))/3
x = (17 - 7)/3
x = 10/3
x = 3.333
So the solution of the system of equations is (x,y) = (3.333, -3.5)
Which is not in the options provided, so the answer is no solution.
Step-by-step explanation:
.In the first Summative Test, Carmen scored 20 points which is 80% of the number
of items. In the second test, she scored 30. Her total score in the 2 tests is 50% of the
total number of items. How many items were in the second test?
Carmen scored 50%of the total number of items in second test, the number of items in the second test is, 75
What is the percentage?The percentage is a mathematical term, which means a number or a ratio which is represented in fractions of 100. We use the '%' symbol to represent the percentage.
Formula for percentage;
Percentage = (present quantity/whole quantity)×100
Given that,
In the first Summative Test,
Carmen scored 20 points which is 80% of the number of items
In the second test,
Carmen scored 30 points,
Her total score is 50% of the number of items
The total number of the items in the second test = ?
Suppose, total number of items in the first test = x
in the second test = y
⇒ 20 points = 80x/100
⇒ 20 points = 0.80x
⇒ x = 25
⇒ 0.5(x + y) = 20 + 50
⇒ x + y = 100
⇒ y = 75
Hence, the total number of items in the second test is 75
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1.234, 1.244 , and 1.247 from greatest to least?
The arrangement with descending trend is 1.247,1.244,1.234
What is a decimal number?A decimal number is a number that consists of a whole number and a fractional part separated by a point. For example – 3.5, 6.79, 78.32, etc.
Given here: The decimal numbers 1.234,1.244,1.247
Now If one decimal in the list has a higher whole number than the others, it’s automatically the greatest number. If a decimal in the list has a smaller whole number than the others on the list, it’s automatically the smallest number. . Create enough rows and columns for all of the digits and number spaces (including the decimal point). Going from left to right, label the columns as tens, ones, decimal, tenths, hundredths, and thousandths.
Thus,
ones decimals tenths Hundreths thousands
1 . 2 3 4
1 . 2 4 4
1 . 2 4 7
∴ The order from greatest to least is 1.247,1.244,1.234
Hence, The arrangement with the descending trend is 1.247,1.244,1.234
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suppose that n people give their hats to a hat-check attendant, who then returns them randomly, one to each person. (thus, all possible re-assignments of hats to people are equally likely). let x be the number of people who receive their own hats back.
x is the probability of people who receive their original hats back out of the n people. All possible re-assignments are equally likely.
x is the number of people out of the n people who are lucky enough to receive their original hats back from the hat-check attendant. All possible re-assignments of hats to people are equally likely. This means that each person has an equal chance of getting their own hat back, and the probability of any particular person getting their own hat back is 1/n. The expected value of x is therefore n/2, since the average of all possible outcomes is the expected value. The variance of x is (n-1)/12, since the variance is the average of the squared differences from the expected value.
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Hi, please help me with this, i will be giving brainly and 5 stars once i submit and make sure everything is correct. thanks!
Answer:
see below
Step-by-step explanation:
every stage is 60m
stage one = -340+60 = -280
stage 2: -280 +60 = -220
stage 3: -220 +60 = -160
stage 4: -160+60 = -100
stage 5: -100+60= -40
stage 6: -40+60 =20
it'll take it 6 stages to fully surface
If x^2+1/x^2 =1, then what is x^3+1/x^3
Answer:
x^3+1/x^3 = x^2
Step-by-step explanation:
If x^2+1/x^2 =1
The equation x^2+1/x^2 =1 states that the sum of the square of x and the reciprocal of x squared is equal to 1. We can multiply both sides of this equation by x(x+1/x) which is x^2 + 1.
This gives us (x^2)(x+1/x) = x^3 + 1/x^3 = 1.
So, x^3+1/x^3 = x^2.
that x^2+1/x^2 =1, we can deduce that x^3+1/x^3 = x^2. This is because we multiplied both sides of the first equation by x^2 + 1/x^2,
which is equal to x^3+1/x^3 = x^2
3x+2=4; 2x-y=5 solve the system of equations algebraically using substitution
this is ur answer.
written by me
I am also class 10 student
Solve for the first variable in one of the equations, then substitute the result into the other equation.Point Form:(2,−1)(2,-1)Equation Form:x=2,y=−1
so the sanswer is 19
—
3.
Please help I can’t figure this out
6 The equation, A equal to P quantity 1 plus 0.054 over 2 end quantity all raised to the power of 2 times t, represents the amount of money earned on a compound interest savings account with an annual interest rate of 5.4% compounded semiannually. If the initial investment is $3,000, determine the amount in the account after 15 years. Round the answer to the nearest hundredths place.
$3,164.19
$6,671.67
$4,473.81
$14,532.47
The amount in the account after 15 years is, $6,671.67
What is compound interest ?A loan or deposit amount is subject to compound interest as interest. In everyday life, it is the most prevalent idea. Both the principal and the interest accrued over time affect the compound interest for a given amount. Between compound and simple interest, this is the primary distinction.
[tex]A = P[1 + r/n]^{nt}[/tex]
A = P + I
Where,
A = compound interest
P = Principle Amount
r = Interest rate
n = number of period for which interest is calculated
t = time
Given that,
A equal to P quantity 1 plus 0.054 over 2 end quantity all raised to the power of 2 times t
an annual interest rate of 5.4% compounded semiannually
the initial investment P is $3,000
the amount in the account after 15 years = ?
[tex]A = 3000[1 + 0.054/2]^{2t}[/tex]
after 15 years compound interest,
[tex]A = 3000[1 + 0.054/2]^{30}[/tex]
A = $6,671.67
A = P + I
P (principal) = $3,000.00
I (interest) = $3,671.67
Hence, the amount in the account after 15 years is, $6,671.67
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Select the two values of x that are roots of this equation.
x2 + 2x – 6 = 0
A. x = -1 - sqrt of 7
B. x = -1 + sqrt of 7
C. x = -1 +2 sqrt of 7
D. x = -1 -2 sqrt of 7
The solution of the quadratic equation is obtained as -1 ± √7. Option A and B.
What is a quadratic equation?We know that a quadratic equation has to do with the kind of equation that have the general form; y = ax^2 + bx + c. This implies that we are going to have the highest power of the variable to be x.
As such, we have the equation that have been written as; x^2 + 2x – 6 = 0. We are to find the roots of the quadratic equation which are the values for x. When we solve the quadratic equation we have;
-1 ± √7
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1. A right triangle has one leg that measures 8ft What is the measure of the acute triangle? Assume that the angle is 36⁰
2. A right triangle has one leg that measures 15ft What is the measure of the acute triangle? Assume that the angle is 36⁰
The measure of the other acute angle of the right angled triangle is 54⁰.
Define the term acute triangle?A form of triangle called an acute triangle has acute angles at each of its three internal angles. Triangles with sharp angles are also known as acute triangles. Acute triangles have different side lengths, but their interior angles are always less than 90°.For the stated question:
Length of one side = 8 ft.
Let angle A = 36⁰.
For right angled triangle, Angle B = 90⁰
Then,
∠A + ∠B + ∠C = 180⁰
36⁰ + 90⁰ + ∠C = 180⁰
∠C = 180⁰ - 126⁰
∠C = 54⁰
Thus, the other acute angle is found as 54⁰.
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The correct question is-
1. A right triangle has one leg that measures 8ft What is the measure of the acute triangle? Assume that the angle is 36⁰
culate absolute and relative change
Question
Upon returning from military deployment, Joseph is trying to describe to his family all that has changed at home w
was away. To illustrate his point, he gathered information about common items that had changed in his absence..
found that the average television size was 40.4 inches at the time of his deployment, and was 42.8 inches by the
returned. What is the absolute and relative change in average television sizes from the time of Joseph's deployme
time he returned?
Round your answer for relative change to the nearest hundredth of a percent.
Do not round until your final answer.
Provide your answer below:
The absolute change in average television sizes from the time of Joseph's deployment time he returned is given as follows:
2.4 inches.
The relative change is given as follows:
5.94%.
How to obtain the absolute and the relative change?The absolute change is given by the absolute value of the difference of the final value by the initial value, hence:
|42.8 - 40.4| = 2.4 inches.
The relative change is given by the division of the absolute change by the initial measure, and then multiplied by 100%, hence:
2.4/40.4 x 100% = 5.94%.
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Find the slope between the points (8,4) and (2,8)