If the line y=mx+7√3 is normal to the hyperbola x224−y218=1, then a value of m is
A
2√5
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B
√52
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C
3√5
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D
√152
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Solution
The correct option is A2√5 x224−y218=1⇒a=√24 and b=√18
We know parametric form of normal to hyperbola is axcosθ+bycotθ=a2+b2⇒√24xcosθ+√18ycotθ=42Atx=0,y=42√18⋅cotθ=42√18tanθ⋯(i)Fory=mx+7√3y=7√3⋯(ii)
From (i) and (ii) 42√18tanθ=7√3⇒tanθ=√32⇒sinθ=±√35
Also, slope of parametrical normal −acosθbcotθ=m⇒m=−√43sinθ=−2√5
or 2√5