If pair of straight lines x2−y2+6x+4y+5=0 are transverse and conjugate axes of hyperbola and perpendicular distance form origin to these lines represent the length of transverse and conjugate axis, then the eccentricity of hyperbola is:
A
√3
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B
√265
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C
√26
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D
2√13
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Solution
The correct options are B√265 C√26 x2−y2+6x+4y+5=0.....(1) Here x2−y2=(x−y)(x+y) Seperate equation of lines are (x−y+l)(x+y+m) In order to find the values of l and m, we have to equation the coefficients of x and y x2−xy+lx+xy−y2+ly+mx−my+lm=0 ⇒x2−y2+(l+m)x+(ly−my+lm)=0⋯(2) Comparing (1) and (2), we get l+m=6 and l−m=4 ∴l=5 and m=1 There are two possible cases for hyperbola equation i.e., (x−y+5)2(√2)2a2−(x+y+1)2b2(√2)2=1or(x+y+1)2(√2)2a2−(x−y+5)2(√2)2b2=1
Case 1: If transverse axis equation is x−y+5=0 then length of transverse axis is 2a=∣∣∣0−0+5√2∣∣∣ ⇒2a=5√2 ⇒a=52√2
If conjugate axis equation is x+y+1=0 then length of conjugate axis is 2b=∣∣∣0+0+1√2∣∣∣⇒b=12√2 ∴e2=1+b2a2 ⇒e=√265
Case 2: If transverse axis equation is x+y+1=0, then length of transverse axis is 2a=∣∣∣0+0+1√2∣∣∣⇒a=12√2 Similarly b=b2√2 ∴e2=1+b2a2 ⇒e=√26