If vector v ⃗ = v ⃗= v ⃗ = 11 ȷ ^ 11ĵ 11 ȷ ^ and vector u ⃗ = u⃗= u ⃗ = 10 ı ^ − 25 ȷ ^ 10î-25ĵ 10 ı ^ − 25 ȷ ^ calculate v ⃗ + 1 5 u ⃗ v⃗+\frac15u⃗ v ⃗ + 5 1 u ⃗ using ı ^ î ı ^ & ȷ ^ ĵ ȷ ^ notation.

Let's give this problem a try. So in this problem we are told that vector v is equal to 11j, and vector u is equal to 10i minus 25j. We're asked to calculate vector v plus 1 fifth of vector u using I and j notation. Okay, So to start this problem what we need to do, or what I'm gonna do here, is I'm going to write out what we have. So we have vector v plus 1 fifth of vector u, which is what we're trying to find, and we have vector v and u given to us in this problem. So what I can do is replace v and u with the vectors that I see up here. So we're going to have vector 'v' which is just 11j that's what's given to us, and that's going to be plus 1 fifth of vector 'u'. Now vector u I can see right here is 10i minus 25j. So this is what happens if I go ahead and replace these vectors with what we're given. Now from here, 11j is just 11j that's not going to change, but I can take this 1 5th and I can scale it into the vector there. So we'll have 1 5th times 10, and 10 divided by 5 is 2. So that means we're going to have 2 I minus, and then we have 25 divided by 5, which is 5j. Now combining these vectors from here might seem a little bit tricky just because we only have a j component and then here we have an I and a j, but recall that when adding or subtracting vectors you want to do these operations to the like components. So since I can see we only have an 11 j, I'm going to focus on the only j we have in here, which is 5 j. We don't even need to worry about this I since there's no other I component. So 2 I is just gonna remain the same, and then we'll have 11 j minus 5 j because that's gonna be plus, but then this is a negative 5. So we have 11 j plus negative 5 j and that's going to come out to 6 j. So I have 2i+6 j, and this right here is the vector and the solution to the problem. So hope you found this video helpful. Thanks for watching.

If vector v⃗=v ⃗=v⃗= 11ȷ^11ĵ11ȷ^ and vector u⃗=u⃗=u⃗= 10ı^−25ȷ^10î-25ĵ10ı^−25ȷ^ calculate v⃗+15u⃗v⃗+\frac15u⃗v⃗+51u⃗ using ı^îı^ & ȷ^ĵȷ^ notation.

13ı^+14ȷ^13î+14ĵ13ı^+14ȷ^

13ı^−5ȷ^13î-5ĵ13ı^−5ȷ^

8. Vectors

Unit Vectors and i & j Notation

Trigonometry

8. Vectors

Unit Vectors and i & j Notation

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Multiple Choice

If vector $v ⃗=$ $11ĵ$ and vector $u⃗=$ $10î-25ĵ$ calculate $v⃗+$\frac$15u⃗$ using $î$ & $ĵ$ notation.

$13î+14ĵ$

$2î+14ĵ$

$13î-5ĵ$

$2î+6ĵ$

Verified step by step guidance

Start by identifying the components of each vector. Vector v⃗ is given as 11ȷ^, which means it has no î component and a ĵ component of 11.

Vector u⃗ is given as 10ı^−25ȷ^, which means it has an î component of 10 and a ĵ component of -25.

To find v⃗ + 1/5 u⃗, first calculate 1/5 of vector u⃗. Multiply each component of u⃗ by 1/5: (1/5 * 10ı^) and (1/5 * -25ȷ^).

This results in a new vector: 2ı^ - 5ȷ^.

Now, add the components of v⃗ and 1/5 u⃗ together: (0ı^ + 2ı^) and (11ȷ^ - 5ȷ^), resulting in the vector 2ı^ + 6ȷ^.

2:17m

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Struggling with Trigonometry?

If vector v⃗=v ⃗=v⃗= 11ȷ^11ĵ11ȷ^ and vector u⃗=u⃗=u⃗= 10ı^−25ȷ^10î-25ĵ10ı^−25ȷ^ calculate v⃗+15u⃗v⃗+\(\frac\)15u⃗v⃗+51u⃗ using ı^îı^ & ȷ^ĵȷ^ notation.

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Unit Vectors and i & j Notation practice set

If vector $v ⃗=$ $11ĵ$ and vector $u⃗=$ $10î-25ĵ$ calculate $v⃗+\(\frac\)15u⃗$ using $î$ & $ĵ$ notation.