First take cross product, make determinant using u and v, write the coefficients of these vectors in matrix. And find determinant.
Now find dot product of the determinant vector and w vector.
For dot product directly multiply coefficients of vectors and add it.
QUESTION 10 Find the triple scalar product (u x v). w of the vectors u =...
Find u. (v * w). This quantity is called the triple scalar product of u, v, and w. u=j, v = 2i, w = 2k Need Help? Read It Talk to a Tutor CS Submit Answer With CamScanner onit Answer with
Using the definition of the scalar product, find the angle between the following vectors. (Find the smallest nonnegative angle.) (a) A = 6i - 7j and B = 8i - 5j [17.33] (b) A = 3i + 3j and B = 3i - 4j + 2k (c) A = i - 2j + 2k and B = 3j + 4k
u and v are perpendicular. Find the triple scalar product of u, v and w=-3⋅u×v+2⋅u+6⋅v if |u|=6, |v|=8.
#8 8. What is the cross product of the vectors A=-31 +3j -4k and B=4i +2j+k. What is the angle between A and B? 9. What is the scalar product of the vectors A= i +3j -2k and B= i +6j + 3k. What is the angle between A and B? 10. What is the scalar product of the vectors A= -31 +3j -4k and B=41 +2j+ k. What is the angle between A and B? 11. Find the area...
Thank you Find u. (w). This quantity is called the triple scalar product of u, v, and w. u = (4, 4, 4), v = (1, 6, 0), (0, -1,0) W = Let T: R3 R3 be a linear transformation such that T(1, 1, 1) = (4,0, -1), T(0, -1, 2) = (-5,2, -1), and T(1, 0, 1) = (1, 1, 0). Find the indicated image. T(2, -1, 1) T(2, -1, 1) = Let T be a linear transformation from...
Using the definition of the scalar product, find the angle between the following vectors. (Find the smallest nonnegative angle.) (a) A = 7i − 8j and B = 3i − 5j ° (b) A = −3i + 6j and B = 3i − 4j + 2k °
QUESTION 18 Find the Jacobian 2(x,y) using x = 7ucosh(Sv), y = 7usinh(8v). Ə(u, v) ОА 392v OB 448u OC 448v OD 392u ОЕ 448uv
4. Determine the scalar triple product of the vectors: 3i2k and c = 3i+ j + 2k a i2jk; b 5. Ifa 3i 2j - k; b = 2i +5j - kand C i + 2j - 2k, find: ax (b x c) (ax b) x t i. ii 4. Determine the scalar triple product of the vectors: 3i2k and c = 3i+ j + 2k a i2jk; b 5. Ifa 3i 2j - k; b = 2i +5j -...
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°
Let u = 5i - j, v = 41+ j, and w=i+6j. Find the specified scalar. u.V+U.W u•v+u•w= (Simplify your answer.) Enter your answer in the answer box. Save for Later < Previous