Question

if the ratio of area of the similar triangle is 98:75 then find ratio of their corresponding perimeter​

Answer 1

Answer:

98:75 is your answer hope it helps

Answer 2

The ratio of similar triangle perimeter​ is $\mathbf{\sqrt{\frac{98}{75}}}$

Step-by-step explanation:

• We know that ratio of area of similar triangle is equal to ratio of square of their corresponding side.

• Similarly ratio of area of similar triangle is equal to ratio of square of their corresponding perimeter.

• We also know that ratio of volume of similar solid is equal to ratio of cube of their corresponding side.

• Now come to question, given data is ratio of area of the similar triangle is 98:75

• $\mathbf{\frac{A_{1}}{A_{2}}=\left ( \frac{P_{1}}{P_{2} \right )^{2}}}$

       $\mathbf{\frac{98}{75}=\left ( \frac{P_{1}}{P_{2} \right )^{2}}}$

• So

        $\mathbf{\frac{P_{1}}{P_{2}}=\sqrt{\frac{98}{75}}=}$ This is the ratio of similar triangle perimeter​