Find the angle between the vectors. (Round your answer to three decimal places.) u = (-3,...
Find the angle θ between the vectors. u = (1, 1, 1), v = (2, -3, 4), <u, v> = u1v1 + 2u2V2 + u3v3 θ = _______ Find the angle θ between the vectors. (Round your answer to two decimal places.) p(X) = 1 - x - x2, q(x) = 1 - x + x2, <p, q> = a0b0 + a1b1 + a2b2
find the angle (in degrees) between the vectors u=5i-j and v=2i+3j. Round the answer tot at least one decimal place if possible. show all work.
Please anwer all the questions. For the vectors u = (1,3,1,2) and u = (2,-1,-3,1). (a) Find the dot product uo u Number (b) Find the vector length u. Enter the answer exactly, using sqrt) if necessary. Number (c) Find the angle between u and v in radians. Enter your answer to 4 decimal places d) Find the exact distance between the vectors u and v, using sqrt) if necessary Number
Solve the age Round to two decimal places as needed) Round to one decimal place as needed) - Round to one decimal place is needed) Write the vector in the form al + b], given its magnitude Iv and the angle a it makes with the positive x-axis. IV = 18, a = 120° (Simplify your answer. Type an exact answer using radicals as needed. Type your answer in the form ai + bj.) Find the direction angle of v...
Find the angle θ between the vectors in radians and in degrees. u = 5i + 2j + k v = 2i - 5j (a) radians (b) degrees
Question 17 Find the vector v with length 3 and the same direction as the vector u =(-1,6,5). •-( tas var - to vote --( tez le ton) Question 18 Find the angle in radians between the vectors u = (0,6, 0,6) and v- (3,5,6,3). Round your answers to three decimal places 1.224 radians 1.003 radians 0.297 radians 0.995 radians 0.881 radians
Find the angle between the given vectors. Round to the nearest tenth of a degree. u=6j, v= 71 – 7j O A. 52.7° OB. 135.0° O C. - 45.0° O D. 134.8°
find angle between vectors u = <1,2,1,-2> and vector v = <-1,1,3,1>. Write answer in terms of inverse trig if necessary (linear algebra)
10. -/3 POINTS LARTRIG10 3.4.044. Use vectors to find the interior angles of the triangle with the given vertices. (Round your answers to two decimal places.) (-2, -3), (2, 8), (9,2) • (smallest value) (largest value) -/1 POINTS LARTRIG10 3.4.049. Find u. v, where is the angle between u and v. || || = 90, || || = 250, 0 =
find the angle between the following pair of vectors: U=(1,2) and V= (-6,3) VULVELUU30 Problem #EC-1 /5 points): Find the angle between the following pair of vectors: U = (1, 2) and V = (-6,3).