Find the value of `n in N` such that the curve `(x/a)^n+(y/b)^n=2` touches the straight line `x/a+y/b=2` at the point `(a , b)dot`

Prove that (x/a)^n+(y/b)^n=2 touches the straight line x/a+y/b=2 for all n in N , at the point (a ,\ b) .

Find the value of a ,b ,c such that curves y=x^2+a x+ba n dy=c x-x^2 will touch each other at the point (1,0) then (a+b+c)=

The equation of normal to the curve (x/a)^n+(y/b)^n=2(n in N) at the point with abscissa equal to 'a can be

Does the straight line (x)/(a)+(y)/(b)=2 touch the ellipse (x/a)^(2)+(y/b)^(2)=2? justify.

At the point P(a , a^n) on the graph of y=x^n ,(n in N), in the first quadrant, a normal is drawn. The normal intersects the y-a xi s at the point (0, b)dot If ("lim")_(avec0)b=1/2, then n equals 1 (b) 3 (c) 2 (d) 4

At the point P(a , a^n) on the graph of y=x^n ,(n in N), in the first quadrant, a normal is drawn. The normal intersects the y-a xi s at the point (0, b)dot If ("lim")_(avec0)b=1/2, then n equals 1 (b) 3 (c) 2 (d) 4

Find the area enclosed by the curves 3x^2+5y=32a n dy=|x-2|dot

Find the area bounded by the curves y=-x^2+6x-5,y=-x^2+4x-3, and the straight line y=3x-15a n d lying right to x=1.

If the line l x+m y+n=0 touches the circle x^2+y^2=a^2 , then prove that (l^2+m^2)a^2=n^2dot

Find a point on the curve y=x^3-3x where the tangent is parallel to the chord joining (1,-2)a n d(2,2)dot