For an equation to pass through the origin, (0,0) must be a solution of the equation. So, for the first one,
[tex] (x + 12)^{2} + (y + 16)^{2} = r_{1}^{2} [/tex]
(0, 0) must satisfy the equation and we can solve for the value of r₁ as shown below.
[tex] (0 + 12)^{2} + (0 + 16)^{2} = r_{1}^{2} [/tex]
[tex] 12^{2} + 16^{2} = r_{1}^{2} [/tex]
[tex] r_{1} = \sqrt{12^{2} + 16^{2}} [/tex]
[tex] r_{1} = 20 [/tex]
Since the second equation of the circle also passes through the origin, we use the same steps from the first one.
[tex] (0 - 30)^{2} + (0 - 16)^{2} = r_{2}^{2} [/tex]
[tex] r_{2} = \sqrt{30^{2} + 16^{2}} [/tex]
[tex] r_{2} = 34 [/tex]
Thus, we have the values for r₁ and r₂ as 20 and 34, respectively.
Answer: r₁ = 20 and r₂ = 34
