Orthogonal, Parallel Or Neither (vectors) (KristaKingMath ~ Lifestyle Blog

Please see the explanation. Compute the dot-product: baru*barv = 3(-1) + 15(5) = 72 The two vectors are not orthogonal; we know this, because orthogonal vectors have a dot-product that is equal to zero. Determine whether the two vectors are parallel by finding the angle between them.The answer is neither. Here's how you do it: Not parallel because: What it means to be parallel means that the two vectors are, well, parallel. In order to know whether it is parallel or not, you look at the vectors and decide whether they can be set as equal. For example, if u= <-2,6> and v= <-5,15>, then they are parallel.Since the angle between the two vectors is 180 degrees we can conclude that are parallel. Part b. u=[1,-1,2] v=[2,-1,1] The dot product on this case is: Since the dot product is not equal to zero then the two vectors are not orthogonal. Now we can calculate the magnitude of each vector like this:Learn how to determine if two vectors are orthogonal, parallel or neither. You can setermine whether two vectors are parallel, orthogonal, or neither uxsingDetermine whether the vectors u and v are parallel, orthogonal, or neither. u = <7, -4>, v = <-28, 16> A) Orthogonal B) Neither C) Parallel

Determine whether the vectors are parallel, orthogonal, or

Determine whether u and v are orthogonal, parallel, or neither. u = j+ 6 k , v = i − 2 j - k check_circleu = i + 2j. v = -2i - 4j. If the two vectors are orthogonal, their dot or scalar product is zero. If the two vectors are parallel, the angle between them is 0 or 180 degrees, or one vector is a scalar multiple of the other.HELP!! 1. Determine whether the vectors u and v are parallel, orthogonal, or neither. u = <6, 4>, v = <-9, 8> 2. . Find the first six terms of the sequence.Brett asked in Science & Mathematics Mathematics · 6 years ago Determine whether the vectors u and v are parallel, orthogonal, or neither u = <10, 6>, v = <9, 5>? Answer Save

Determine whether the given vectors are orthogonal

vec u and vec v are orthogonal Given two vectors vec u = {u_1,u_2} and vec v = {v_1,v_2} their scalar product << vec u, vec v >> is deffined as << vec u, vec v >> = sum_i u_iv_i = u_1v_1+u_2v_2 In the presented case we have << vec u, vec v >> =costheta sintheta-sintheta costheta = 0 when this occurs with neither of vec u, vec v being a null vector, it is said that them are orthogonal. OfWell, we can rule out orthogonal, but we don't know parallel or neither. Then we'd need to find out the angle by dividing the +3 by the product of the magnitudes of each vector and take the...Determine whether u and v are orthogonal, parallel, or neither. u = 1/4 (3i - j) v = 5i + 6j. Step 1: The vectors and . Rewrite the vectors as and . The vectors are orthogonal If . The dot product of the vectors and is defined as .. Since the dot product is not equals to zero, the vectors are not orthogonal.. Step 2:Determine Whether The Given Vectors Are Orthogonal, Parallel,or Neither:(a) U = , V =. Question: Determine Whether The Given Vectors Are Orthogonal, Parallel,or Neither:(a) U = , V =. This problem has been solved!Use the given vectors u, and v to find the expression. u = 2i - 3j + k and v = -3i + 3j + 2k Find a vector orthogonal to both u and v.

The vectors u = < 7, 2 > v = < 21, 6 >

Calculate the attitude between the vectors by way of the usage of following system

cos θ =(u.v)/|u||v|

u . v = < 7, 2 > . < 21, 6 >

u . v = 7(21) + (2)(6)

u . v = 147 + 12

u . v = 159

Calculate the magnitude of vectors.

Magnitude of a vector |a| = √(x2 + y2)

|u| = √(49 + 4) = √53

|v| = √(441 + 36) = √477

cos θ = u.v/|u||v|