Location of Roots when Compared to two constants 'k1' & 'k2'
If one root o...
Question
If one root of x2−2p(x−4)−15=0 is less than 1 and the other root is greater than 2, then the range of p is
A
(−∞,73)
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B
R
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C
(0,7)
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D
(73,∞)
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Solution
The correct option is A(−∞,73) Let f(x)=x2−2p(x−4)−15 and α,β be roots of f(x)=0.
Now, according to condition, we can plot the graph as:
f(x)=x2−2px+(8p−15)
Now, the conditions to be satisfied are: (A)D>0 ⇒4p2−4(8p−15)>0⇒p2−8p+15>0
Now, Discriminant of p2−8p+15, =64−120<0 ⇒p2−8p+15>0∀p∈R