Introduction to Twelve Basic Functions - Page 4
Questions
- How do you determine if #g(x) = -6x + 5x^3# is an even or odd function?
- How do you determine if # f(x) = x((x^2)-1)# is an even or odd function?
- How do you find the inverse of #f(x) = 2x+1#?
- How are the graphs #f(x)=x^2# and #g(x)=4(x-3)^2# related?
- How do you find the inverse of # f(x)= x^2-7#?
- How do you find the inverse of # y = 6x – 3#?
- How do you find the inverse of #F(x)=4x^3 - 18x^2 + 27x#?
- How do you describe the transformation of #f(x)=(x-1)^3+2# from a common function that occurs and sketch the graph?
- How do you determine if #y = (x^4 + 1) / (x^3 - 2x)# is an even or odd function?
- How do you graph the function #f(x)=abs(2x)# and its inverse?
- How do you determine if #f(x)= 2x^3+6x # is an even or odd function?
- How do you determine if #g(x)= -9x^3 - 8# is an even or odd function?
- How do you determine if #f(x)= x^4 - 4x^2# is an even or odd function?
- What are the twelve basic functions?
- How do you find the inverse of #y=3x^2-5#?
- How do you find #f^-1(x)# given #f(x)=(x+2)^2+6#?
- How do you determine whether #f(x) = 2^x + 2^-x# is an odd or even function?
- How do you know if #x^4 cos(4x) # is an even or odd function?
- What is the inverse of the function #f(x)=(2x+1)/x#?
- How do you find the inverse of #f(x)=5 x-2#?