Hi, can you solve the question for me step by step, I will rate up if the working is correct. I will post the answer together with the question.
Answer:
Hi, can you solve the question for me step by step, I will rate up if...
Hi, can you solve the question for me step by step, I will rate up if the working is correct. I will post the answer together with the question. Answer: Question 4 A particle of mass m is moving in a horizontal plane in a circle of radius R, with angular velocity 6, anti-clockwise given by é t+cos(2t) Implement plane polar unit vectors er and ee, in the horizontal plane, and k in the vertical direction, giving a right-handed coordinate...
Question 4 a) Differentiate with respect to x, i. y = sin 2x ii. y = x In(5x + 2) b) Show that if y = cotx, dy dx -cosec? x c) Show that if y = tan x, then dy dx 1 1+xal Question 5 Use calculus to find any turning points of the function A(t) = te-020 and determine their nature (maximum, minimum or inflexion) using any method. Question 6 a) Find tan” x dx b) Use integration...
Please solve both parts and box your answers, and I will rate your answer with a thumbs up. Thank you! Use Green's Theorem to evaluate the line integral (y – x) dx + (2x - y) dy for the given path. C: boundary of the region lying between the graphs of y = x and y = x2 – 8x Need Help? Read It Watch It Talk to a Tutor 2/1 Points] DETAILS PREVIOUS ANSWERS LARCALCET7 15.4.012. Use Green's Theorem...
Hi, can you solve the question for me step by step, I will rate up if the working is correct. I will post the answer together with the question. Answer: Question 5 A particle of mass m rests on a smooth horizontal track. It is connected by two springs to fixed points at A and B, which are a distance 2lo apart as shown in Figure Q5. The left-hand spring has natural length 2lo and stiffness k, whilst the right-hand...
I am struggling very much with this question, could you please provide a detailed answer, I will rate it. Thank you very much. |(a) Differentiate the following functions with respect to and simplify your answer 1. possible far as as -5 1 mark (ii) esin (2r [4 marks 11 y = In(a) [5 marks (b) Determine the following da : sin (i) 6 marks dx 11 - 1)(x +3) |(a) Differentiate the following functions with respect to and simplify your...
Please Solve As soon as Solve quickly I get you thumbs up directly Thank's Abdul-Rahim Taysir Find out the polar form of the complex number 1-i from the following options. O cos A + i sin tä o COS 3 + i sin 37 4 O 1 cos CE + i sin O cos + i sin ſ Find the derivative of the function f (z) = 272, at z = -1. You do not have to use the concept...
can someone help me solve #5 and please show work, thank you! 5.5 EXERCISES 1-6 Evaluate the integral by making the given substitution. 1. cos 2x dx, u= 2x 2. | xe dx, u = -x x3 + 1 dx, u= x + 1 sin cos e de, u = sin e - dx, u=x4 - 5
Tutorial Exercise Evaluate the integral using the substitution rule. sin(x) 1/3 1* dx cos(x) Step 1 of 4 To integrate using substitution, choose u to be some function in the integrand whose derivative (or some constant multiple of whose derivative) is a factor of the integrand. Rewriting a quotient as a product can help to identify u and its derivative. 70/3 1." sin(x) dx = L" (cos(x) since) dx cos?(X) Notice that do (cos(x)) = and this derivative is a...
Can you please give me a step by step on some of these? 23. Use the substitution method to evaluate the following indefinite integrals. (a) / 22(22 + 1)23 dx : + 7)(x2 + 7x + 3)4/5 dx (e) {(3x + 1)* de (a) / (2 – 22) de (@) ſtv7€ + 12 dt (n / van de (8) / ( vt * 133 die (h) t4/3 – 565 dt (0) / sva – 3 de (1) / sec(22) tan(2x)...
Hi, can you solve the question for me step by step, I will rate up if the working is correct. I will post the answer together with the question. Answer: Question 5 This problem analyzes projectile motion. A netball player throws the ball from a point 4.5 metre horizontally from the net as shown in Figure Q5. The ball is thrown witha speed of 9 ms-1 at an angle of projection of α to the horizontal. Assume the acceleration due...