Suppose that a function is 1) continuous and differentiable…
Suppose that a function is 1) continuous and differentiable on the interval 0,∞{“version”:”1.1″,”math”:”0,∞”} 2) the only asymptote on the graph is x=0{“version”:”1.1″,”math”:”x=0″} 3) the graph has a minimum when x=1{“version”:”1.1″,”math”:”x=1″} 4) the graph is concave up for all x{“version”:”1.1″,”math”:”x”} in the domain Write three conclusions you can make about the graph in terms of information that you can obtain from the first and second derivatives.