3.9 Modeling using variation (Page 2/14)

Precalculus

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Q&A

Do the graphs of all direct variation equations look like [link] ?

No. Direct variation equations are power functions—they may be linear, quadratic, cubic, quartic, radical, etc. But all of the graphs pass through $(0,0) .$

Try It

The quantity $y$ varies directly with the square of $x .$ If $y = 24$ when $x = 3,$ find $y$ when $x$ is 4.

$\frac{128}{3}$

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Solving inverse variation problems

Water temperature in an ocean varies inversely to the water’s depth. Between the depths of 250 feet and 500 feet, the formula $T = \frac{14,000}{d}$ gives us the temperature in degrees Fahrenheit at a depth in feet below Earth’s surface. Consider the Atlantic Ocean, which covers 22% of Earth’s surface. At a certain location, at the depth of 500 feet, the temperature may be 28°F.

If we create [link] , we observe that, as the depth increases, the water temperature decreases.

$d,$ depth	$T = \frac{14,000}{d}$	Interpretation
500 ft	$\frac{14,000}{500} = 28$	At a depth of 500 ft, the water temperature is 28° F.
350 ft	$\frac{14,000}{350} = 40$	At a depth of 350 ft, the water temperature is 40° F.
250 ft	$\frac{14,000}{250} = 56$	At a depth of 250 ft, the water temperature is 56° F.

We notice in the relationship between these variables that, as one quantity increases, the other decreases. The two quantities are said to be inversely proportional and each term varies inversely with the other. Inversely proportional relationships are also called inverse variations .

For our example, [link] depicts the inverse variation . We say the water temperature varies inversely with the depth of the water because, as the depth increases, the temperature decreases. The formula $y = \frac{k}{x}$ for inverse variation in this case uses $k = 14,000.$

Graph of y=(14000)/x where the horizontal axis is labeled, “Depth, d (ft)”, and the vertical axis is labeled, “Temperature, T (Degrees Fahrenheit)”.

A General Note

Inverse variation

If $x$ and $y$ are related by an equation of the form

y = \frac{k}{x^{n}}

where $k$ is a nonzero constant, then we say that $y$ varies inversely with the $n th$ power of $x .$ In inversely proportional relationships, or inverse variations , there is a constant multiple $k = x^{n} y .$

Writing a formula for an inversely proportional relationship

A tourist plans to drive 100 miles. Find a formula for the time the trip will take as a function of the speed the tourist drives.

Recall that multiplying speed by time gives distance. If we let $t$ represent the drive time in hours, and $v$ represent the velocity (speed or rate) at which the tourist drives, then $v t = distance .$ Because the distance is fixed at 100 miles, $v t = 100.$ Solving this relationship for the time gives us our function.

\begin{array}{l} t (v) = \frac{100}{v} \\ = 100 v^{- 1} \end{array}

We can see that the constant of variation is 100 and, although we can write the relationship using the negative exponent, it is more common to see it written as a fraction.

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How To

Given a description of an indirect variation problem, solve for an unknown.

Identify the input, $x,$ and the output, $y .$
Determine the constant of variation. You may need to multiply $y$ by the specified power of $x$ to determine the constant of variation.
Use the constant of variation to write an equation for the relationship.
Substitute known values into the equation to find the unknown.

Solving an inverse variation problem

A quantity $y$ varies inversely with the cube of $x .$ If $y = 25$ when $x = 2,$ find $y$ when $x$ is 6.

The general formula for inverse variation with a cube is $y = \frac{k}{x^{3}} .$ The constant can be found by multiplying $y$ by the cube of $x .$

\begin{array}{l} k = x^{3} y \\ = 2^{3} \cdot 25 \\ = 200 \end{array}

Now we use the constant to write an equation that represents this relationship.

\begin{array}{l} y = \frac{k}{x^{3}}, k = 200 \\ y = \frac{200}{x^{3}} \end{array}

Substitute $x = 6$ and solve for $y .$

\begin{array}{l} y = \frac{200}{6^{3}} \\ = \frac{25}{27} \end{array}

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Questions & Answers

find the equation of the tangent to the curve y=2x³-x²+3x+1 at the points x=1 and x=3

Esther Reply

derivative of logarithms function

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ex 2.1 question no 11

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ex 2.1 question no. 11

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Find the derivative of g(x)=−3.

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abdulkadir

f(x) = x-2 g(x) = 3x + 5 fog(x)? f(x)/g(x)

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fog(x)= f(g(x)) = x-2 = 3x+5-2 = 3x+3 f(x)/g(x)= x-2/3x+5

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how to use fundamental theorem to solve exponential

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find the bounded area of the parabola y^2=4x and y=16x

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Chicken nuggets

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🐔🦃 nuggets

(mathematics) For a complex number a+bi, the principal square root of the sum of the squares of its real and imaginary parts, √a2+b2 . Denoted by | |. The absolute value |x| of a real number x is √x2 , which is equal to x if x is non-negative, and −x if x is negative.

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find integration of loge x

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find the volume of a solid about the y-axis, x=0, x=1, y=0, y=7+x^3

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Can calculus give the answers as same as other methods give in basic classes while solving the numericals?

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log tan (x/4+x/2)

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y=(x^2 + 3x).(eipix)

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Source: OpenStax, Precalculus. OpenStax CNX. Jan 19, 2016 Download for free at https://legacy.cnx.org/content/col11667/1.6

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