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2. The positions of a point (in meters) is given as a function of time t...
Could you label and explain how to get each term?
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3. Find the equation of the tangent line to the graph of f(x)-1+e 0 4 Graph the following function, using information such as intervals of increase and decrease, relative extrema, intervals of upward and downward concavity, and inflection points: g(x) 3x4 +4.x Pro):-I -2 16 3 a7 al 16 min(-1,-1) y " 30+24K: 12x(3x+2) t ip. (oo) 2 3
3. Find the equation of the tangent line to...
2. Let f(t) = 2+1 (a) Find the intervals over which f is increasing and decreasing. (b) Find the local maximums and minimums of f. (c) Find the intervals of concavity of f. (d) Find the inflection points of f.
for f(x) = * - 1. Find and label the following (if they exist) for f(x (a) Intervals of increase / decrease (b) the x-coordinates of all local maximums and local minimums (c) Intervals of concavity (d) the x-coordinates of all inflection points
Graph the polynomial using calculus methods. F(x)= 7/3 x3 + 13/2 x2 -12x +3 List local extrema, intervals of concavity, and inflection point(s) if they exist. Local maximum: Local Minimum: Concave up: Concave down: Inflection point(s):
The x position of an object is given by the equation t3/(t2-4). Find the equations representing the velocity and acceleration in the x-direction and the extremum positions on the time interval (-2,2). Determine whether they are maximums, minimums or inflection points.
An object moves up and down. Its height, h in feet, is a function of time, t in seconds. It is known that • The domain is (-2,4). • The initial height is h(0) = 7 feet. • The graph of the velocity is h' (ft/s) 12 А. t(s) 1 -8 -12 1. What intervals is the height is increasing or decreasing? Enter answers using interval notation. Enter multiple intervals as comma-separated list. increasing (0.2) decreasing (-2,0), (2, 4) 2....
Question 11 10 pts The derivative f'(2) of an unknown function f(x) has been determined as f'(x) = (x - 2)(+3)2. Use this derivative to find the intervals where the original function f is increasing/decreasing. Then find the x-values that correspond to any relative maximums or relative minimums of the original unknown function f(x). O no relative maximum; relative minimum at x=2 relative maximum at x=-3; no relative minimum O relative maximum at x=2; relative minimum at x=-3 relative maximum...
Use the Concavity Theorem to determine where the given function is concave up and where it is concave down. Also find all inflection points. 12) g(x) = 2x3 + 2x + 7 A) Concave up for all x no inflection points B) Concave up on (0, concave down on ( 0) infection point (0.7) c) Concave up on ( 0), concave down on (0 ); Inflection point (0,7) D) Concave down for all no inflection points Provide an appropriate response....
(x + 1)2 Consider the function f(x) -. The first and second derivatives of f(x) are 1 + x2 2(1 – x2) 4x(x2 - 3) f'(x) = and f" (2) Using this information, (1 + x2) (1 + x2)3 (a) Find all relative extrema. (4 points) Minimum: Maximum: (b) Find the intervals of concavity for f(x) and identify any inflection points for yourself. (5 points) Concave up: Concave down: (c) Using the fact that lim f(x) = 1, and our...
1. Find the absolute maximum and absolute minimum of the function f(x) = x + 2 on the interval [16] 2. For the function f(x) = 3x48x3 +17, find a Intervals of increase, interrels of decrease, and local extrema. b. Intervals of concave upward, intends of concave dowward, and inflection points