The slope of the line touching both the parabolas y2=4x and x2=−32y is :
A
12
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B
32
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C
18
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D
23
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Solution
The correct option is A12 Let slope of tangent be m
Equation of tangent in terms of slope m for parabola y2=4x is y=mx+1m⋯(1) This is also a tangent to x2=−32y, so ⇒x2=−32(mx+1m)⇒mx2+32m2x+32=0 From the condition of tangency, we get D=0⇒(32m2)2−4×m×32=0⇒32m4−4m=0⇒4m(8m3−1)=0⇒m=0 or m=12 m=0 (not possible because it is not a tangent to parabola y2=4ax) ∴m=12
Alternate solution : Equation of tangent in terms of slope m for parabola y2=4x is y=mx+1m⋯(1) Now for this line to be tangent to parabola x2=−32y ⇒1m=8m2 ⇒m3=18 ⇒m=12