2 Answers

Jayesh Lathiya · Answer 1 · 2019-09-16T05:10:15+0000

In this example, y is equal to 8.

In order to find this, first note that the two x value expressions create a straight line. That means when we add them together they will equal 180. this will give us a value for x.

x + 10 + 10x - 61 = 180

11x - 51 = 180

11x = 231

x = 21

Now that we have the value of x, we can do the same for the straight line created by the x + 10 angle and the 18y + 5 angle.

x + 10 + 18y + 5 = 180

(21) + 10 + 18y + 5 = 180

36 + 18y = 180

18y = 144

y = 8

JayK · Answer 2 · 2019-09-22T15:04:43+0000

Answer:

x=21 and y=8

Explanation:

In the figure we have a vertical line that has 180º then the sum of (10x-61)º and (x+10)º have to be equal to 180º. WIth the next process we can find x:

$(10x-61)^o+(x+10)^o=180^o\\10x-61^o+x+10^o=180\\11x-51^o=180^o\\11x=180^o+51^o\\11x=231^o\\x=(231^o)/(11)\\x=21^o$