In Exercises $24-29$ find the measure of each angle. The ratio of the measures of two complementary angles is $4 : 5 .$

In Exercises $24-29$ find the measure of each angle. The ratio of the measures of two supplementary angles is $11 : 4$

In Exercises $24-29$ find the measure of each angle. The measures of the angles of a triangle are in the ratio $3 : 4 : 5$

In Exercises $24-29$ find the measure of each angle. The measures of the acute angles of a right triangle are in the ratio $5 : 7$ .

In Exercises $24-29$ find the measure of each angle. The measures of the angles of an isosceles triangle are in the ratio $3 : 3 : 2$

Write the algebraic ratio in simplest form. $$\frac{3(x+4)}{a(x+4)}$$

$\frac{3}{a}$

expose fours on the top of the bottom, therefore cancels, therefore a left with three over a.

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## Discussion

## Video Transcript

expose fours on the top of the bottom, therefore cancels, therefore a left with three over a.

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