please answer 18 , 19, 20 (a) wrtical shift gonitsup (e) Horizonial shift 9 wnits to the right (e) Nose of these (d) Horisomal shift 9 units to the lefi Find the amplitnde, pesiod or phase shif. F...
2. Sketch the graph of the following functions and find the values of x for which lim f(x) does not exist. b)/(x) = 1, x = 0 f(x)- 5, x=3 c) x2 x>1 2x, x> 3 d) f(x)-v e) (x)- [2x 1- sin x Discuss the continuity of the functions given in problem #2 above. Also, determine (using the limit concept) if the discontinuities of these functions are removable or nonremovable 3. Find the value of the constant k (using...
Find the trigonometric function value of angle A. 9) Find the amplibade of y 5) sin A7 and A in quadrant Find sec A A)π C) 3 Maltiply and simplify 10) (cos x - sin x)2 60 Convert to radians measure. Leave your answer in terms of A) cos2x+2 sin x - sin2x B) 1 C) 1-2 sin x cos D) cos2x+2 sin2x Answer the question. 11) Given the angle θ in standard position with the point (4, -3) lying...
8. For 0 < < 27. find all solutions of sec r = eser. 14. Given a right triangle with sides a and b and hypotenuse c. 20. Find b and c 1 sin B and a = 2 B! tan A 100 and 6 = 100. Find a and c. C. cos B = 5 13 and a = 20. Find b and c. 15. Find two values of a between 0 and 2 such that tanx = V3....
please answer all!
1. 2. 3. 4.
The graph on the right models the monthly average temperature y in degrees Fahrenheit for a city, where x is the month. AY 50- 40- 30- (a) Find the maximum and minimum average monthly temperatures. (b) Find the amplitude and period, and interpret the results. (c) Explain what the x-intercepts represent. 20- 10- х °F. The minimum monthly 0- (a) The maximum monthly average temperature is average temperature is °F. 6 8 10...
I need help with these two problems, I know how to find the
phase shift I got pi/4, and for the first question I know it shifts
to the right and the second problem shifts to the left, but I want
to know how you determine whether the shift is moving left or
right
Two graphs that depict a one dimensional water wave, as a function of position, at two separate times (at 1-0 s and t = 1.0 s)...
uestion 5 The base of a solid is the circle x 9. Find the volume of the solid given that the cross sections perpendicular to the x-axis are squares. а) @ 146 b) 147 e) 148 d) 144 e) 143 uestion 7 ketch the region bounded by the following curves and etermine the centroid of the region. y=x2-2x and y=5x-x2 (12) 21 7 15 21 b) 16 7 21 13 7 7 13 8' 8 Review Later Question 8 Find...
Numerical methods problems 1, 2 and 3
1. Find the area of the region bounded by f(x)-25-x2 , g(x)-V36-x2 . x=2, and (a) right Riemann sum with 8 segments. (b) midpoint rule with 8 segments (e) Simpson's rule with 8 segments. Determine the average of the function f(x)=2x sinyx on the interval [1.8,3.4] using Romberg rule for 1, 2, 4 and 8 segments. 2, A new fuel for recreational boats being developed at the local university was tested at an...
PLEASE ANSWER ALL PARTS AND SHOW WORK. THANK YOU!
Find the point on the graph of z = -22 - y2 - ty that is the farthest above the plane 5x + 4y + z = -3 (use vertical distance, not overall distance). How far above the plane is that point? Select one: a. 12 b. 5 C. 3 d. 10 e. 7 If X and Y have joint density function 8xy if 0 < x <1, 0 < y...
-1-1 arctan n n" n!5* (c) Find the interval of convergence and radius of convergence for )0301 i )e-3r) (d) Use the geometric series to write the power series expansion for i. f(1)- 2-4r, centered at a = 0. i.)4 centered at a-6. (e) Write the first 4 nonzero terms of the Maclaurin expansion for i, f(z) = z2 (e4-1) ii. /(x) = cos(3r)-2 sin(2x). (0) Use the Taylor Series definition to write the expansion for f(a)entered at (8) Use...
1. (2 pts each) The graph of some unknown function f is given below. 10 6/ 8-64-2 624 10 12 Use the graph to estimate the following quantities: (0 f (9) (g) f(4) b) lim (a) lim (e) (d) lim ( 6) (e) lim f(x) (c) lim f(x) if g(x)f(x) 6) a value of r where f is continuous but not differentiable (k) a value of r where f"(x) 0 and f"(x)>0 (1) the location of a relative maximum value...