Let point $C$ be between $V$ and $W$ on $\overline{ ext { FW }}$. Given that $V W=61, V C=z+13$, and $C W=z+8$, solve for $z$.
A 18
B 19
C 20
D 21
Please select the best answer from the choices provided
A
B
C
D

Question

Let point $C$ be between $V$ and $W$ on $\overline{	ext { FW }}$. Given that $V W=61, V C=z+13$, and $C W=z+8$, solve for $z$.
A 18
B 19
C 20
D 21
Please select the best answer from the choices provided
A
B
C
D

StudyXY · Accepted Answer

: Since point $C$ is between points $V$ and $W$ on $\overline{	ext { FW }}$, we can write the length of segment $\overline{	ext { VW }}$ as the sum of the lengths of segments $\overline{	ext {VC}}$ and $\overline{	ext {CW}}$. : We are given that $VW = 61$, $VC = z + 13$, and $CW = z + 8$. : Simplify and solve for $z$: The value of $z$ is 20, which corresponds to answer choice C.

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QuestionAnatomy and Physiology

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Step 1
: Since point $C$ is between points $V$ and $W$ on $\overline{\text { FW }}$, we can write the length of segment $\overline{\text { VW }}$ as the sum of the lengths of segments $\overline{\text {VC}}$ and $\overline{\text {CW}}$.

Step 2
: We are given that $VW = 1$, $VC = z + 1$, and $CW = z + 1$.

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