Math, asked by chirag277, 9 months ago

For what value of K given equation has real and equal roots (k+1)x2-2(k-1)x+1=0??

Answers

Answered by dkdevender
2

Answer:

The value of k is 3

Given:

(k+1)x×2-2(k-1)x+1=0(k+1)x×2−2(k−1)x+1=0

To find:

The value of k

Solution:

We know that,

For a quadratic equation x^{2}+b x+c=0x

2

+bx+c=0 , if the roots are real and equal then

Discriminant b^{2}-4ac=0 \rightarrow(1)b

2

−4ac=0→(1)

Now, in an equation (k+1) x \text { times } 2-2(k-1) x+1=0(k+1)x times 2−2(k−1)x+1=0

a = k+1, b= -2(k-1), c=1a=k+1,b=−2(k−1),c=1

Given that roots are real and equal

Therefore,

[-2(k-1)]^{2}-4(k+1)(1]=0[−2(k−1)]

2

−4(k+1)(1]=0

Now, the above equation can be written as,

4\left(k^{2}-2 k+1\right)-4 k-4=04(k

2

−2k+1)−4k−4=0

On simplifying the above equation, we get

4\left(k^{2}-2 k+1\right)-4 k-4=04(k

2

−2k+1)−4k−4=0

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Answered by Rajaswal
1

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