QUESTION IMAGE
Question
solving for an unknown using the distributive property the equation $a = \frac{180(n - 2)}{n}$ represents the angle measures, $a$, in a regular $n$-sided polygon. when the equation is solved for $n$, $n$ is equal to a fraction with a denominator of $a - 180$. what is the numerator of the fraction?
Step1: Start with the given equation
We have the equation \( a=\frac{180(n - 2)}{n} \). First, we multiply both sides of the equation by \( n \) to get rid of the denominator on the right - hand side.
\( a\times n=\frac{180(n - 2)}{n}\times n \)
Simplifying the right - hand side, we have \( an = 180(n - 2) \)
Step2: Expand the right - hand side
Using the distributive property, we expand \( 180(n - 2) \) to get \( 180n-360 \). So our equation becomes \( an=180n - 360 \)
Step3: Collect like terms
We want to get all the terms with \( n \) on one side. Subtract \( 180n \) from both sides:
\( an-180n=- 360 \)
Step4: Factor out \( n \)
Factor out \( n \) from the left - hand side: \( n(a - 180)=-360 \)
Step5: Solve for \( n \)
Now, we divide both sides by \( a - 180 \) to solve for \( n \). So \( n=\frac{- 360}{a - 180}=\frac{360}{180 - a} \) (we can multiply the numerator and denominator by - 1 to make the denominator \( a - 180 \)). Wait, let's do it step by step from \( n(a - 180)=-360 \). If we divide both sides by \( a - 180 \), we get \( n=\frac{-360}{a - 180}=\frac{360}{180 - a} \), but we need the denominator to be \( a - 180 \). Let's re - arrange the equation \( an=180n - 360 \) again.
Starting over:
Given \( a=\frac{180(n - 2)}{n} \)
Multiply both sides by \( n \): \( an = 180n-360 \)
Subtract \( an \) from both sides: \( 0=180n - an-360 \)
Add 360 to both sides: \( 360 = 180n - an \)
Factor out \( n \) on the right: \( 360=n(180 - a) \)
Then \( n=\frac{360}{180 - a}=\frac{- 360}{a - 180} \). But we need the fraction with denominator \( a - 180 \). So if we write \( n=\frac{N}{a - 180} \), from \( n(a - 180)=-360 \), then \( N=-360 \)? Wait, no. Wait, let's go back to \( n(a - 180)=-360 \). So \( n=\frac{-360}{a - 180} \). The problem says "n is equal to a fraction with a denominator of \( a - 180 \)". So the numerator is - 360? Wait, that can't be. Wait, maybe I made a mistake in the sign.
Wait, let's start again:
\( a=\frac{180(n - 2)}{n} \)
Multiply both sides by \( n \): \( an=180(n - 2) \)
\( an = 180n-360 \)
Subtract \( 180n \) from both sides: \( an - 180n=-360 \)
\( n(a - 180)=-360 \)
So \( n=\frac{-360}{a - 180} \). If we consider the fraction with denominator \( a - 180 \), the numerator is - 360? But maybe we can factor out the negative sign. Wait, let's check the steps again.
Wait, the problem says "n is equal to a fraction with a denominator of \( a - 180 \)". So from \( n(a - 180)=-360 \), when we solve for \( n \), we have \( n=\frac{-360}{a - 180} \), so the numerator is - 360? But let's see, maybe there is a miscalculation.
Wait, let's do the algebra again:
Given \( a=\frac{180(n - 2)}{n} \)
Multiply both sides by \( n \): \( an = 180n-360 \)
Bring all \( n \) terms to left: \( an-180n=-360 \)
Factor \( n \): \( n(a - 180)=-360 \)
Then \( n=\frac{-360}{a - 180} \). So the numerator of the fraction (when the denominator is \( a - 180 \)) is - 360? But maybe the problem considers the positive numerator. Wait, if we multiply numerator and denominator by - 1, we get \( n=\frac{360}{180 - a} \), but the denominator here is \( 180 - a=-(a - 180) \). So if we want the denominator to be \( a - 180 \), then \( n=\frac{-360}{a - 180} \), so the numerator is - 360. But let's check the original equation. The sum of interior angles of a polygon is \( 180(n - 2) \), and each interior angle \( a=\frac{180(n - 2)}{n} \). If \( a\) is an interior angle, \( a<180 \) (for convex polygons), so \( a - 180<0 \), and \( n \) is positive (number of sides), so the numerator should be negative if t…
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