Find two unit vectors orthogonal to both 9, 4, 1 and -1, 1, 0. Find two unit vectors orthogonal to a = \langle 4,-1,-5 \rangle and b = \langle 1,0,2\rangle Find two unit vectors orthogonal to both [3,2,1] and [-
Two vectors are orthogonal if they have an angle {eq}90^\circ {/eq} between them. A cross product of two vectors is orthogonal two both. The cross product is obtained by the determinant value of the vectors {eq}{\bf{i,j,k}} {/eq} arranged in the first row and t...
Find the value(s) of b so that the two vectors (-3 b, 0, 1) and (b, 2, 1) are orthogonal. Find all the values of b for which the vectors \langle 1,2,-3\rangle and \langle b^2, b, 5\rangle are orthogonal. Find the values of b for which ...
百度试题 结果1 题目Two vectors u and v are given. Find a vector orthogonal (perpendicular) to both u and v. u=(1,1,-1), v=(-1,1,-1) 相关知识点: 试题来源: 解析 (0, 2, 2) 反馈 收藏
百度试题 结果1 题目Find two unit vectors that are orthogonal to both j+2k and i-2j+3k. 相关知识点: 试题来源: 解析 7/(3√6)=2/(3√6)j1/(3√6)k; 7/(3√6)=2/(3√6)j1/(3√6)k. 反馈 收藏
convert_to_volume compound create_arrow_strands create_empty_volume node create_mesh_cube create_mesh_plane create_mesh_sphere dissipation_influence drag_influence file_cache find_all_in_array find_orthogonal_vectors fog_density_to_level_set node get_volume_tile_info_internal node get_volume_tile_...
Step 1: Define the vectorsLet:- A=^i+^j+^k- B=2^i−3^j Step 2: Find the normal vector to the planeTo find a vector that lies in the plane formed by A and B, we can take the cross product of these two vectors. Step 3: Compute the cross product A×BThe cross product ca...
1. Find the scalar and vector projections of b onto a. a = (4, 7, -4) b = (4, -1, 1) a) scalar projection of b onto a b) vector projection of b onto a 2. For the vectors a = \left \langle 1,4 \ Find two unit vectors orthogonal to a= \la...
结果1 题目Find two unit vectors that are orthogonal to both j+2 k and i-2 j+3 k. 相关知识点: 试题来源: 解析 7(3√ 6) i+ 2(3√ 6) j- 1(3√ 6) k; - 7(3√ 6) i- 2(3√ 6) j+ 1(3√ 6) k. 反馈 收藏
Two vectors are orthogonal if their dot product is zero. Therefore, we need to set up the equation:→p⋅→q=0 Step 2: Write the dot product of the vectorsSubstituting the given vectors into the dot product formula:(3^i−2^j)⋅(2^i+a^j)=0...