Let g(x) be a function defined on [-1,1]. If the area of the equilateral triangle with two of its vertices at (0,0) and `(x,g(x))` is `(sqrt(3))/(4)` , then the function g(x) , is

Let g(x) be a function defined on [-1,1] .If the area of the equilateral triangle with two of its vertices at (0,0) a n d(x,g(x)) is (a) (sqrt(3))/(4) then the function g(x) is (b) g(x)=+-sqrt(1-x^(2))(cx)=sqrt(1-x^(2))(d)g(x)=-sqrt(1-x^(2))g(x)=sqrt(1+x^(2))(d)

Let f(x) be a real valued function such that the area of an equilateral triangle with two of its vertices at (0, 0) and (x, f(x)) is (sqrt(3))/(4) square units. Then f(x) is given by

Let f(x) be a real valued function such that the area of an equilateral triangle with two of its vertices at (0, 0) and (x, f(x)) is (sqrt(3))/(4) square units. Then The domain of the function is

Let f(x) be a real valued function such that the area of an equilateral triangle with two of its vertices at (0, 0) and (x, f(x)) is (sqrt(3))/(4) square units. Then Perimeter of the equilateral triangle is

Let f be a function defined on [0,2]. Then find the domain of function g(x)=f(9x^(2)-1)

Let g be a function defined by g(x)=sqrt({x})+sqrt(1-{x}) .where {.} is fractional part function, then g is

Let g:[1,3]rarr Y be a function defined as g(x)=In(x^(2)+3x+1). Then

Let the function f, g, h are defined from the set of real numbers RR to RR such that f(x) = x^2-1, g(x) = sqrt(x^2+1), h(x) = {(0, if x lt 0), (x, if x gt= 0):}. Then h o (f o g)(x) is defined by

Let f and g be two real valued functions ,defined by f(x) =x ,g(x)=[x]. Then find the value of f+g