The curves `y=x^3, 6y=7-x^2` intersect at (1, 1) at an angle of

The curves y=x^(2) and 6y=7-x^(3) intersect at the point (1, 1) at an angle :

The two curves y=3^x and y=5^x intersect at an angle

The two curves y=3^x and y=5^x intersect at an angle

Find the value of a if the curves ay+x^(2)=7 and x^(3)=y intersect at right angle at Point (1,1)

If theta is the angle of interaction of the curves y^2=x^3 and y=2x^2-1 at (1, 1), then |tantheta| =

The angle of intersection of the curves y=x^(2), 6y=7-x^(3) at (1, 1), is: a) pi/4 b) pi/3 c) pi/2 d) pi

Prove that the curves "x"="y"^2 and "x y"="k" intersect at right angles if 8"k"^2=1.

If the curves y^2=6x , 9x^2+by^2=16 intersect each other at right angles then the value of b is: (1) 6 (2) 7/2 (3) 4 (4) 9/2

If the curves y^2=6x , 9x^2+by^2=16 intersect each other at right angles then the value of b is: (1) 6 (2) 7/2 (3) 4 (4) 9/2

If the curves y^2=6x , 9x^2+by^2=16 intersect each other at right angles then the value of b is: (1) 6 (2) 7/2 (3) 4 (4) 9/2