Location of Roots when Compared to two constants 'k1' & 'k2'
Consider the ...
Question
Consider the quadratic equation (cā5)x2ā2cx+(cā4)=0. Let S be the set of all integral values of c for which one root of the equation lies in the interval (0,2) and another root lies in the interval (2,3). The number of elements in S is
A
10
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B
11
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C
12
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D
18
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Solution
The correct option is B11 (c−5)x2−2cx+(c−4)=0
For the equation to be quadratic in nature, c−5≠0⇒c≠5
Now, (c−5)x2−2cx+(c−4)=0⇒x2−2c(c−5)x+(c−4)(c−5)=0
The required conditions are, (i)f(0)⋅f(2)<0⇒(c−4)(c−5)×(4−4c(c−5)+(c−4)(c−5))<0⇒(c−4)(c−24)(c−5)2<0⇒c∈(4,24)−{5}⋯(1)(ii)f(2)⋅f(3)<0⇒(c−24)(4c−49)(c−5)2<0⇒c∈(494,24)⋯(2)
From equation (1) and (2), we get
c∈(494,24) ∴S={13,14,⋯,23}
Hence, the number of elements in the set S is n(S)=11