`f(x)=sin[x]+[s in x],0

'f(x)=sin[x]+[sin x],0 can also be represented as

If f(x)=(sin2x+A sin x+B cos x)/(x^(3)) is continuous at x=0, the value of A,B and f(0) are :

if f(x)=(sin[x])/([x]+1),x>0 and f(x)=((sin[x])/(2)[x])/([x]),x<0 and f(x)=k,x=0 where [x] denotes the greatest integer less than or equal to x=0, then in order that the continuous at x=0, the value of k is equal to

If F(x) =[(cos x, -sin x,0),(sin x,cos x,0),(0,0,1)] show that F(x)F(y)=F(x+y)

If f(x)=sin x/ e^(x) in [0,pi] then f(x)

If f(x) = sin x - cos x , x != 0 , is continuous at x = 0, then f(0) is equal to

[f(x)={[(sin3x)/(sin x),,x!=0],[k,,x=0] is continuous,if k is

If F(x)=[[cos x,-sin x,0sin x,cos x,00,0,1]], then which of

Define f(x)=(1)/(2)[|sin x|+sin x],0