coolmust200
Answered

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whats the answer plzzz

Whats The Answer Plzzz class=

Sagot :

djtwinx017
m < 105° and m < (10x + 15)° have the same measure because they are alternate interior angles that do not have a common vertex on alternate sides of the transversal. Since they have the same measure, we can solve for x:

m < 105° = m < 10x° + 15 °

Subtract 15 from both sides:

m < 105° - 15° = 10x°

90° = 10x°

Divide both sides by 10 to solve for x:

90°/10 = 10x/10

9° = x

Therefore, the value of x = 9°

Substitute this value into m < (10x + 15)° to find its true measure:

10(9) + 15 = 90 + 15 = 105°

This proves my statements earlier that m < 105° has the same measure as m < (10x + 15)°

The correct answer is x = 9°


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