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Find the value of xx, y, and z in the parallelogram below

Find the value of xx, y, and z in the parallelogram below-example-1
User Carl Yuheng Ren
by
2.6k points

1 Answer

20 votes
20 votes

In a parallelogram the opposite angles are equal in measure, then, in our case:


6y+5=71

Solving for y:


y=(71-5)/(6)
y=(66)/(6)
y=11

Also, we have to consider that any two adjacent angles add up to 180°, meaning:


(3x-8)+71=180
3x-8+71=180
3x+63=180
x=(180-63)/(3)
x=(117)/(3)
x=39

Using the same logic as the one used to calculate y, we can do the following:


(6z+7)=(3x-8)

However, as we know x = 39° we can solve for z:


6z+7=3\cdot(39)-8
6z=117-8-7
z=(102)/(6)
z=17

Answer:

• x = 39°

,

• y = 11°

,

• z = 17°

User Funkenstrahlen
by
2.8k points