Question

Find the largest open interval on which the graph of the function f (x) = x4 +6x3 x is concave down Use interval notation, with no spaces in between numbers and brackets. For example: (3,8) Answer: Which of the following statements are true about the function below on the interval [a,b]? AA The derivative is 0 at two values of x both being local maxima. The derivative is 0 at two values of x, one on the interval [a,b] while the other is neither a global maximum nor global minimum The function has two critical points (numbers). The graph of the function is concave down at its global minimum. а. b being global maximum а а с. The graph of the function is concave up at its global maximum. е.

Answer 1

f(x) = x + 6 x3 +an for concave down! f (x) <0 i f'(a)= 4x3 + 18x²+1 f" (a) = 12 x² + 364 co → 12241 2+3) co + - 3 - 2€ (-3,0) 2 € 0 ART (b) is correct. DUUUUUUUTTTTTTTTTTTTE The derivative of function is ft tangent to cueve is parallel to e-anis. So, ① & ② lines are 1 x-anis. And f(A) has highest valie in [a, b ] while f(B) does not have highest / lowest values in [a b]. so f(x) has deni vative o at 2 pourts in Eub] One being global maxima other nethers momme (global)