1 Answer

Adam Ware · Answer 1 · 2023-03-25T16:39:09+0000

Given the diagram below

Introducing 'a', as shown above, it can be observed that

$a=61^0(\text{corresponding angles)}$

It can also be observed that

$\begin{gathered} 3y-41=a=61^0(\text{vertically opposites angles are equal)} \\ 3y-41=61 \\ 3y=61+41 \\ 3y=102 \\ y=(102)/(3)=34 \end{gathered}$

It can also be observed that

$(3y-41)^0+z=180^0(\text{angles on a straight line)}$

Substitute for y to get z

$\begin{gathered} 3(34)-41+z=180 \\ 102-41+z=180 \\ 61+z=180 \\ z=180-61 \\ z=119^0 \end{gathered}$

Hence, the value of y is 34°, while z is 119°.

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