Introduction to Twelve Basic Functions - Page 2
Questions
- How do you determine if #f(x)=x^5-x+5# is an even or odd function?
- How do you find the inverse function of #f(x)=x/(x+1)#?
- How do you determine if #y=2x^5+x# is an even or odd function?
- How do you determine if #g(x) = (4+x^2)/(1+x^4)# is an even or odd function?
- Prove that #(cosxcotx)/(1 - sinx) - 1 = cscx#?
- How do you determine if #f(x)= In(x)# is an even or odd function?
- How do you find the inverse of #g(x) = y = (x-6)^5#?
- How do you determine if #2 sin x cos x# is an even or odd function?
- How do you determine if #y=sin x# is an even or odd function?
- How do you determine if #f(x)= 1+ sinx# is an even or odd function?
- How are the graphs #f(x)=x^3# and #g(x)=0.75(x+1)^3# related?
- How do you determine if #f(x) = x^2 - x^8# is an even or odd function?
- How do you find the inverse of #(1+3x)/(1-2x)#?
- How do you sketch the graph #g(x)=-x^5-3# and #f(x)=x^5# using transformations and state the domain and range of g?
- How do you find the inverse of #2x + 3y = 6#?
- How do you determine if #f(x)=-3x²+7# is an even or odd function?
- What is the inverse function of #f(x)=x-2# and how do you find #f^-1(0)#?
- How do you determine whether # (2-x)^(1/3)# is an odd or even function?
- How do you find #f^-1(x)# given #f(x)=1/x#?
- How are the graphs #f(x)=x^3# and #g(x)=(x+2)^3-5# related?