" (B) "x^((2)/(3))+x^((1)/(3))-2=0

The point(s) of minimum of function,f(x)=4x^(3)-x|x-2|,x in[0,3] is x=0 (b) x=(1)/(3)x=(1)/(2)(d)x=2

f(x)= {((sin(a+2)x + sin x)/x, x lt 0), (b, x=0), ((((x + 3x^2 )^(1/3) - x^(1/3))/x^(4/3)), x gt 0):} Function is continuous at x = 0 , find a + 2b .

F(x) = {( (sin(a+2)x + sin x)/x , x lt 0), (b , x = 0), (((x + 3x^2 )^(1/3) - x^(1/3))/x^(4/3)), x gt 0):} Function is continuous at x = 0, find a + 2b .

Solve the equation (2b^(2)+x^(2))/(b^(3)-x^(3))-(2x)/(bx+b^(2)+x^(2))+(1)/(x-b)=0 For what value of x is the solution of the equation unique ?

Let X=[{:(x_(1)),(x_(2)),(x_(3)):}],A=[{:(1,-1,2),(2,0,1),(3,2,1):}] and B=[{:(3),(1),(4):}] .If AX=B, then X is equal to: a) [(1),(2),(3)] b) [(-1),(2),(3)] c) [(-1),(-2),(3)] d) [(-1),(-2),(-3)]

Value of ((x-1)^(3)+(2x-1)^(3)-(3x2)^(3))/((x-1)(2x-1)(3x-2)) is equal to (A)-3(B)0(C)1(D)3

Suppose the vectors x_(1), x_(2) and x_(3) are the solutions of the system of linear equations, Ax=b when the vector b on the right side is equal to b_(1), b_(2) and b_(3) respectively. If x_(1)=[(1),(1),(1)], x_(2)=[(0),(2),(1)], x_(3)=[(0),(0),(1)], b_(1)=[(1),(0),(0)], b_(2)=[(0),(2),(0)] and b_(3)=[(0),(0),(2)] , then the determinant of A is equal to :

If b gt 1, x gt 0 and (2x)^(log_(b) 2)-(3x)^(log_(b) 3)=0 , then x is

If b gt 1, x gt 0 and (2x)^(log_(b) 2)-(3x)^(log_(b) 3)=0 , then x is

If a,B and y are the roots of x^(3)+2x+1=0 then roots of equation (x+1)^(3)+2(x^(2)-1)(x-1)-(x-1)^(3)=0 are