QUESTION IMAGE
Question
- find the values of x and y.
(18y + 5)°
(10x - 61)°
(x + 10)°
- find the values of x and y.
(2y + 5)°
(5x - 17)°
(3x - 11)°
Step1: Use vertical - angle property for problem 15
Vertical angles are equal. So, $10x−61=x + 10$.
Solve for $x$:
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Also, since the sum of angles around a point is $360^{\circ}$ and the other pair of vertical angles are equal, and we assume the angles are part of a linear - pair or vertical - angle relationship. If we consider the fact that the two given non - vertical angles are supplementary (a common case in such angle problems), we have no information about $y$ from this single equation for $x$. But if we assume the two non - vertical angles are vertical angles, then $18y + 5=10x−61$. Substitute $x = \frac{71}{9}$ into it:
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Step2: Use angle - sum property for problem 16
The sum of angles on a straight line is $180^{\circ}$. For the angles $(5x−17)^{\circ}$ and $(3x - 11)^{\circ}$, we have $(5x−17)+(3x - 11)=180$.
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Since the angle with measure $(2y + 5)^{\circ}$ and one of the other angles (say the one adjacent to it on a straight - line or in a right - angle relationship) are related. If we assume the angle $(2y + 5)^{\circ}$ and the angle formed by the right - angle and one of the $x$ - related angles are complementary. Let's assume the right - angle is part of the angle - sum situation. Then, if we consider the fact that the sum of angles around the intersection point is relevant. If we assume the angle $(2y + 5)^{\circ}$ and the angle $(3x - 11)^{\circ}$ are complementary (since there is a right - angle in the figure), substitute $x = 26$ into the equation $2y+5+3x - 11 = 90$.
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For problem 15: $x=\frac{71}{9},y=\frac{58}{81}$
For problem 16: $x = 26,y = 9$