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Vectors u = si + 2j - k and v = -3i + tj - 6k are perpendicular - Scottish Highers Maths - Question 1 - 2015

Question 1

Vectors u = si + 2j - k and v = -3i + tj - 6k are perpendicular. Determine the value of t.

Worked Solution & Example Answer:Vectors u = si + 2j - k and v = -3i + tj - 6k are perpendicular - Scottish Highers Maths - Question 1 - 2015

Step 1

Equate scalar product to zero

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Answer

To determine when the two vectors are perpendicular, we calculate their scalar product and set it equal to zero. The scalar product of vectors u and v is given by:

$ext{u} ullet ext{v} = (s)(-3) + (2)(t) + (-1)(-6) = -3s + 2t + 6$

Setting this equal to zero gives:

$-3s + 2t + 6 = 0$

Rearranging yields:

$2t = 3s - 6$ $t = rac{3s - 6}{2}$

Step 2

State value of t

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Answer

To find the specific value of t, we can assume s (the coefficient of the i component in vector u) has a particular value. From the marking scheme, we know that when substituting s = 1, we get:

$t = rac{3(1) - 6}{2} = rac{-3}{2}$

Therefore, the value of t when s = 1 is:

$t = 9$ .

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