x(x + 3) 3. Sketch the graph of taking care to explain (x – 3)2' how...
1. Find the critical point of f(x) = (x + 1)^. 2. Use the Second Derivative Test to determine whether f(x) = (2x + 12 has a local maximum or a local minimum at x = 0 x(x + 3) 3. Sketch the graph of taking care to explain (x – 3)2 how you deduce all the important features.
Be sure to identify all Problem 6: Show how to sketch the graph of f(x) = important features of the graph. e. Be sure to identify all Problem 7: Show how to sketch the graph of f(x) = important features of the graph.
Sketch the graph of the function f(x) - (2-6)(x+3) 9(2+2) A sketch need not be exact or to scale! A sketch does need to show important points and features of the graph: intervals on which the function is increasing/decreasing, concavity, points at which local and absolute max, and min. values occur, inflection points, intercepts, vertical and horizontal asymptotes, and any other features particular to the particular function,
sketch a graph of the given functions f(x)=(x-3)^2 f(x)=-x^3 f(x)=4|x-2|-6 please explain
Question 4: Let fCx) -5 +3. a) Sketch the graph of f(x). b) is f(x) one to one, why? c) If f(x) is one to one, find fx) d) Deduce the graph of f1(x).
#4) The following signal x(t) is given (graph). Sketch (a) x(-t/3) (b) -2x(-3t+3) - 2 Please help me and explain the steps? I'm really trying to understand this. Thank you 3 F-1
Sketch a graph of the function f(x) = 3 cos (+ + 2 (Entry tip: The first graphing tool will drag the sine/cosine graph from the lowest/highest point to the highest lowest point of the curve. The second graphing tool will drag the sine/cosine graph from the midpoint to the lowest/highest point. You can use either.) 2/2 27 /2 2 / Clear All Draw. W W Question 2. Points possibles This is attempt 1 of 1 OM OSS MacBook Air
3. Sketch the graph of the curve y vx' -5x + 6 = x (x-2)(x-3).
3. Using Curve Sketching methods, sketch the graph of the (x function y for -2T < x < 27T. Make sure that COS you include all steps, charts, and derivations details. 3. Using Curve Sketching methods, sketch the graph of the (x function y for -2T
3 (i) Sketch y= 2* and y=x+2 on the same axes. (ii) Use your sketch to deduce the number of roots of the equation 2* = x+2. (iii) Find each root, correct to 3 decimal places if appropriate.