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Question
Find the value of k for which the following equations have real and equal roots:
\[\left( k + 1 \right) x^2 - 2\left( k - 1 \right)x + 1 = 0\]
Solution
The given quadric equation is \[\left( k + 1 \right) x^2 - 2\left( k - 1 \right)x + 1 = 0\], and roots are real and equal
Then find the value of k.
Here,
a = k + 1,b = -2(k-1) and ,c = 1
As we know that D = b2 - 4ac
Putting the value of a = k + 1,b = -2( k -1) and ,c = 1
` = {-2 (k-1)}^2 - 4 xx (k-1 ) xx 1`
` = {4(k^2 - 2k +1)} - 4k - 4`
`=4k^2 -8k + 4 - 4k - 4`'
`=4k^2 - 12k + 0`
The given equation will have real and equal roots, if D = 0
`4k^2 - 12k+ 0 =0 `
`4k^2 - 12k = 0`
Now factorizing of the above equation
`4k (k-3) = 0`
`k (k-3) = 0`
So, either
k=0 or (k - 3) = 0
k = 3
Therefore, the value of k = 0,3.
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