The point of intersection of the curves ...

The point of intersection of the curves whose parametric equations are `x=t^2+1,y=2t and x=2s,y=2/s` is given by :

A

`(1,-3)`

B

`(-2,4)`

C

(1,2)

D

(2,2)

Text Solution

Verified by Experts

The correct Answer is:

D

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Knowledge Check

The orthocentre of the triangle whose sides are given by equations x=1,y=0 and x+y-2=0 , is

A

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B

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Angle of intersection of the curves y = x^(2) and 6y = 7- x^(3) at (1,1)

A

`pi/4`

B

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C

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D

`pi/6`

Equation of the separate lines of the pair of lines, whose equation is x^(2)-x y-12 y^(2)=0 are given by

A

`x+4 y=0` and `x-3 y=0`

B

`x-6 y=0` and `x-3 y=0`

C

`2 x-3 y=0` and `x-4 y=0`

D

`x-4 y=0` and `x+3 y=0`

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