Find the Value of k for Which the Roots Are Real and Equal in 5x² − 4x + 2 + k(4x² − 2x − 1) = 0

Find the Value of k for Which the Roots Are Real and Equal

Solution

Given: $$5x^2-4x+2+k(4x^2-2x-1)=0$$

$$ (5+4k)x^2-(4+2k)x+(2-k)=0 $$

Here, $$a=5+4k,\quad b=-(4+2k),\quad c=2-k$$

For real and equal roots, $$D=b^2-4ac=0$$

$$ (4+2k)^2-4(5+4k)(2-k)=0 $$

$$ 16+16k+4k^2-4(10+3k-4k^2)=0 $$

$$ 16+16k+4k^2-40-12k+16k^2=0 $$

$$ 20k^2+4k-24=0 $$

$$ 5k^2+k-6=0 $$

$$ (5k+6)(k-1)=0 $$

$$ k=-\frac{6}{5}\quad \text{or}\quad k=1 $$

The value(s) of k for which the roots are real and equal is: $$ \boxed{k=-\frac{6}{5}\ \text{or}\ k=1} $$

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