Given the following functions, use function composition to determine if f(C ) and g(I) are inverse fuentions. f(I) = 1' - 2 and g(z) = VI + 2 (a) (f o g)(z) = (b) (go f) (1) (c) Thus g(I) Select an answer ~ the inverse function of f(z)Find the domain and range of the following graph in interval notation. Domain: Range: NOTE: If you do not see an endpoint, assume that the graph continues forever in the same direction. Entry example: [2,3) or (-oo,5). Enter -oo for negative infinity and oo for infinity.Consider the function in the graph to the right. The function has a maximum of at x = The function has a minimum of at x = The function is increasing on the interval(s): The function is decreasing on the interval(s): The domain of the function is: The range of the function is:Consider the function graphed at right. The function has a Select an answer v value of at T = 5 4 -3 - 2 - 1 The function is increasing on the interval(s): The function is decreasing on the interval(s):The graph above is a transformation of the function VI Write an equation for the function graphed above g(I) =Write an equation for the function graphed above Enter abs(x) for I or use Mathquill to enter your answer (2nd video link is on how to use Mathquill)