5.8 Modeling using variation (Page 3/14)

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A quantity $y$ varies inversely with the square of $x .$ If $y = 8$ when $x = 3,$ find $y$ when $x$ is 4.

$\frac{9}{2}$

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Solving problems involving joint variation

Many situations are more complicated than a basic direct variation or inverse variation model. One variable often depends on multiple other variables. When a variable is dependent on the product or quotient of two or more variables, this is called joint variation . For example, the cost of busing students for each school trip varies with the number of students attending and the distance from the school. The variable $c,$ cost, varies jointly with the number of students, $n,$ and the distance, $d .$

A General Note

Joint variation

Joint variation occurs when a variable varies directly or inversely with multiple variables.

For instance, if $x$ varies directly with both $y$ and $z,$ we have $x = k y z .$ If $x$ varies directly with $y$ and inversely with $z,$ we have $x = \frac{k y}{z} .$ Notice that we only use one constant in a joint variation equation.

Solving problems involving joint variation

A quantity $x$ varies directly with the square of $y$ and inversely with the cube root of $z .$ If $x = 6$ when $y = 2$ and $z = 8,$ find $x$ when $y = 1$ and $z = 27.$

Begin by writing an equation to show the relationship between the variables.

x = \frac{k y^{2}}{\sqrt[3]{z}}

Substitute $x = 6,$ $y = 2,$ and $z = 8$ to find the value of the constant $k .$

\begin{matrix} 6 & = & \frac{k 2^{2}}{\sqrt[3]{8}} \\ 6 & = & \frac{4 k}{2} \\ 3 & = & k \end{matrix}

Now we can substitute the value of the constant into the equation for the relationship.

x = \frac{3 y^{2}}{\sqrt[3]{z}}

To find $x$ when $y = 1$ and $z = 27,$ we will substitute values for $y$ and $z$ into our equation.

\begin{matrix} x & = & \frac{3 {(1)}^{2}}{\sqrt[3]{27}} \\ = & 1 \end{matrix}

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Try It

A quantity $x$ varies directly with the square of $y$ and inversely with $z .$ If $x = 40$ when $y = 4$ and $z = 2,$ find $x$ when $y = 10$ and $z = 25.$

$x = 20$

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Media

Access these online resources for additional instruction and practice with direct and inverse variation.

Visit this website for additional practice questions from Learningpod.

Key equations

Direct variation	$y = k x^{n}, k is a nonzero constant .$
Inverse variation	$y = \frac{k}{x^{n}}, k is a nonzero constant .$

Key concepts

A relationship where one quantity is a constant multiplied by another quantity is called direct variation. See [link] .
Two variables that are directly proportional to one another will have a constant ratio.
A relationship where one quantity is a constant divided by another quantity is called inverse variation. See [link] .
Two variables that are inversely proportional to one another will have a constant multiple. See [link] .
In many problems, a variable varies directly or inversely with multiple variables. We call this type of relationship joint variation. See [link] .

Section exercises

Verbal

What is true of the appearance of graphs that reflect a direct variation between two variables?

The graph will have the appearance of a power function.

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If two variables vary inversely, what will an equation representing their relationship look like?

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Is there a limit to the number of variables that can vary jointly? Explain.

No. Multiple variables may jointly vary.

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Algebraic

For the following exercises, write an equation describing the relationship of the given variables.

Questions & Answers

how to study physic and understand

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the transfer of energy by a force that causes an object to be displaced; the product of the component of the force in the direction of the displacement and the magnitude of the displacement

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difference between model and theory

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Is the ship moving at a constant velocity?

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The full note of modern physics

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introduction to applications of nuclear physics

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the explanation is not in full details

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yes

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Show that the equal masses particles emarge from collision at right angle by making explicit used of fact that momentum is a vector quantity

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Isaac

A wave is described by the function D(x,t)=(1.6cm) sin[(1.2cm^-1(x+6.8cm/st] what are:a.Amplitude b. wavelength c. wave number d. frequency e. period f. velocity of speed.

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A body is projected upward at an angle 45° 18minutes with the horizontal with an initial speed of 40km per second. In hoe many seconds will the body reach the ground then how far from the point of projection will it strike. At what angle will the horizontal will strike

Gufraan Reply

Suppose hydrogen and oxygen are diffusing through air. A small amount of each is released simultaneously. How much time passes before the hydrogen is 1.00 s ahead of the oxygen? Such differences in arrival times are used as an analytical tool in gas chromatography.

Ezekiel Reply

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Samuel

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the science concerned with describing the interactions of energy, matter, space, and time; it is especially interested in what fundamental mechanisms underlie every phenomenon

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nuclei having the same Z and different N s

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Source: OpenStax, College algebra. OpenStax CNX. Feb 06, 2015 Download for free at https://legacy.cnx.org/content/col11759/1.3

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