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Question

If both the roots of the equation x2+2(k+1)x+9k5=0 are negative, then the least positive integral value of k is

A
1.00
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B
1.0
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C
1
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Solution

Let f(x)=x2+2(k+1)x+9k5.
Roots of x2+2(k+1)x+9k5=0 are α,β
Given: α,β<0

Conditions that needs to be satisfied are:
(i) D04(k+1)24(9k5)0k27k+60
(k1)(k6)0k(,1][6,) (1)

(ii) b2a<0Here, a=1,b=2(k+1)(k+1)<0k>1 (2)

(iii) f(0)>002+2(k+1)0+9k5>09k5>0k>59 (3)

From (1),(2) and (3), we get:


k(59,1][6,)
Hence, the least positve integral value of k is 1.

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