Location of Roots when Compared to two constants 'k1' & 'k2'
If both the r...
Question
If both the roots of the quadratic equation x2−mx+4=0 are real and distinct and they lie in the interval [1,5], then m lies in the interval :
A
(3,4)
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B
(4,5]
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C
(4,5)
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D
(5,6)
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Solution
The correct option is B(4,5] x2−mx+4=0
Roots are real and distinct ∴D>0 ⇒m2−16>0 ⇒(m−4)(m+4)>0 ⇒m∈(−∞,−4)∪(4,∞)⋯(1)
Roots lie in the interval [1,5]⇒1≤α<β≤5
The possible cases are,
So, the required conditions are, f(1)≥0 ⇒12−m+4≥0 ⇒m≤5 ⇒m∈(−∞,5]⋯(2)
f(5)≥0 ⇒25−5m+4≥0 ⇒m≤295 ⇒m∈(−∞,295]⋯(3)
1<−b2a<5 ⇒1<m2<5 ⇒2<m<10 ⇒m∈(2,10)⋯(4)
Thus, from equations (1),(2),(3) and (4), we get m∈(4,5]