find the value of 'a' for which the function f defined by
f(x)={a sin( pie/2) x+1 ,x < 0
{(tan x -sinx) / x3 ,x>0
is continuous at x=0
if Cosy= xCos(a+y), show that dy/dx= cos2(a+y)/sin(a)
show that f(x) =|x-2| is continuous but not differentiable at x=2. Please reply!!URGENT!!!
if ex+ey=ex+y,prove that dy/dx= -ey-x
integration of root tanx ?
if siny= xsin(a+y),then prove that dy/dx=sin^2(a+y)/sin a
differentiate wrtx
under root (1+sinx/1-sinx)
types of partial fraction
find the value of 'a' for which the function f defined by
f(x)={a sin( pie/2) x+1 ,x < 0
{(tan x -sinx) / x3 ,x>0
is continuous at x=0
√x +bx^2 - √x / b x^3/2 , x >0
function is continuous at x=0
c ,x=0
(under root x+bx)-(under root x)/b under root x3, x>0 is constant at x=0
if Cosy= xCos(a+y), show that dy/dx= cos2(a+y)/sin(a)
show that f(x) =|x-2| is continuous but not differentiable at x=2. Please reply!!URGENT!!!
if ex+ey=ex+y,prove that dy/dx= -ey-x
integration of root tanx ?
if siny= xsin(a+y),then prove that dy/dx=sin^2(a+y)/sin a
f(x)={(1-cos4x)/x^2 if x k if x=0
(√x)/√16+root of x-4 }
differentiate wrtx
under root (1+sinx/1-sinx)
types of partial fraction