Answer:
The radii of the circles are 12 cm and 7cm.
Step-by-step explanation:
Let the radii of the circles be [tex]r_{1}\ and\ r_{2}[/tex]
Given:
Sum of circumference of two circles= 38π cm
Formula for circumference of a circle with radius r = 2πr
[tex]2\pi r_{1}+2\pi r_{2}=38\pi \\r_{1}+r_{2}=19[/tex]------------1
Sum of areas of two circles= 193π cm²
Area of circle with radius r = πr²
[tex]\pi r_{1}^{2}+\pi r_{2}^{2}=193\pi \\r_{1}^{2}+r_{2}^{2}=193[/tex]-------2
Substituting r2 = 19 - r1 in equation 2 we get:
[tex]r_{1}^{2}+(19-r_{1})^{2}=193\\2r_{1}^{2}-38r_{1}+168=0\\r_{1}^{2}-19r_{1}+84=0\\(r_{1}-12)(r_{1}-7)=0\\r_{1}=12\ or\ 7[/tex]
Then r2 = 19 - r1
[tex]r_{2}=12\ or\ 7[/tex]
