1 Answer

Chad Schultz · Answer 1 · 2023-04-29T12:14:04+0000

Variables

• x: Number of orders Melissa served

,

• y: Number of orders Chris served

,

• z: Number of orders Jim served

Given that they served a total of 76 orders, then:

$x+y+z=76\text{ (eq. 1)}$

Given that Melissa served 8 fewer orders than Chris, then:

$x=y-8\text{ (eq. 2)}$

Given that Jim served 2 times as many orders as Chris, then:

$z=2y\text{ (eq. 3)}$

Substituting equations 2 and 3 into equation 1, and solving for y:

$\begin{gathered} (y-8)+y+2y=76 \\ (y+y+2y)-8=76 \\ 4y-8=76 \\ 4y-8+8=76+8 \\ 4y=84 \\ (4y)/(4)=(84)/(4) \\ y=21 \end{gathered}$

Substituting y = 21 into equations 2 and 3:

$\begin{gathered} x=21-8=13 \\ z=2\cdot21=42 \end{gathered}$

The final answer is:

• Number of orders Melissa served: ,13

,

• Number of orders Chris served: ,21

,

• Number of orders Jim served: ,42

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