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Question
If the quadratic equation `(1+m^2)x^2+2mcx+(c^2-a^2)=0` has equal roots, prove that `c^2=a^2(1+m^2)`
Solution
Given:
`(1+m^2)x^2+2mcx+(c^2-a^2)=0`
Here,
`a=(1+m^2), b=2mc and c=(c^2-a^2)`
It is given that the roots of the equation are equal; therefore, we have:
`D=0`
⇒` (b^2-4ac)=0`
⇒ `(2m)^2-4xx(1+m^2)xx(c^2-a^2)=0`
⇒`4m^2c^2-4(c^2-a^2+m^2c^2-m^2a^2)=0`
⇒` 4m^2c^2-4c^2+4a^2-4m^2c^2+4m^2a^2=0`
⇒`-4c^2+4a+4m^2a^2=0`
⇒`a^2+m^2a^2=c^2`
⇒`a^2(1+m^2)=c^2`
⇒`c^2=a^2(1+m^2)`
Hence proved
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