x2 + 4x + 3 Consider the function f(x) x + 4 x2+8x + 13 a. Find the first derivative. f'(x) = (z +4)2 b. List any critical values.-4 - /3,-4+ /3 c. Identify intervals of increase. d. Identify intervals of decrease. 6 e. Find the second derivaitve. f''(x) = (x + 4)3 when x = f. Based on parts b through e, f(x) has a maximum of y = when x = g. Based on parts b through e, f(x) has a minimum of y = h. Use the second derivative to identify intervals where f(x) is concave up. i. Use the second derivative to identify intervals where f(x) is concave down. j. Use the second derivative to find any inflection points. k. State any vertical asymptotes. 1. State any slant asymptotes. Submit Question Jump to Answer

Please solve everything I have not answered. I have to say this but please tell me why I have to use two posts, I've paid for this service, the least you can do is give the full answer. There are times you don't even give the right answer, so I've wasted a question on you guys.

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x2 + 4x + 3 Consider the function f(x) x + 4 x2 + 8x + 13 a. Find the first derivative. f'(x) = (z +4)2 b. List any critical values. -4- /3,-4+ /3 c. Identify intervals of increase. d. Identify intervals of decrease. 6 e. Find the second derivaitve. f''(x) = (z + 4)3 when x = f. Based on parts b through e, f(x) has a maximum of y = when x = g. Based on parts b through e, f(x) has a minimum of y = h. Use the second derivative to identify intervals where f(x) is concave up. i. Use the second derivative to identify intervals where f(x) is concave down. j. Use the second derivative to find any inflection points. k. State any vertical asymptotes. 1. State any slant asymptotes. Submit Question Jump to Answer