The curve `y^(2)=(x-a)(x-b)^(2), a, b gt 0` and `a gt b` does not exist for ………….. .

solve (x^(2)-1)/(x-2)gt0

If [dot] denotes the greatest integer function, then (lim)_(xvec0)x/a[b/x] b/a b. 0 c. a/b d. does not exist

Consider the regions A= {(x, y)|x^(2) + y^(2) le 100 } and B = {(x, y) |sin (x+y) gt 0} in the plane. Then find the area of the region A uu B .

Evalaute int_(b)^(prop) (dx)/(a^2+x^2) a gt 0,b epsilon R .

If (a, a^(2) ) falls inside the angle made by the lines y=(x)/(2), x gt 0 and y = 3x, x gt 0 , then a belongs to

If the area bounded by the x-axis, the curve y=f(x), (f(x)gt0)" and the lines "x=1, x=b " is equal to "sqrt(b^(2)+1)-sqrt(2)" for all "bgt1, then find f(x).

The locus of the midpoints of the chords of the circle x^2+y^2-a x-b y=0 which subtend a right angle at (a/2, b/2) is (a) a x+b y=0 (b) a x+b y=a^2=b^2 (c) x^2+y^2-a x-b y+(a^2+b^2)/8=0 (d) x^2+y^2-a x-b y-(a^2+b^2)/8=0

If b > a , then the equation (x-a)(x-b)-1=0 has (a) both roots in (a ,b) (b) both roots in (-oo,a) (c) both roots in (b ,+oo) (d)one root in (-oo,a) and the other in (b ,+oo)