The point A, with coordinates (0, a, b) lies on the line l₁, which has equation r = 6i + 19j - k + λ(i + 4j - 2k). (a) Find the values of a and b. The point P lies on l₁ and such that OP is perpendicular to l₁, where O is the origin. (b) Find the position vector of point P. Given that B has coordinates (5, 15, 1), (c) show that the points A, P and B are collinear and find the ratio AP : PB.

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The point A, with coordinates (0, a, b) lies on the line l₁, which has equation r = 6i + 19j - k + λ(i + 4j - 2k) - Edexcel - A-Level Maths Pure - Question 7 - 2006 - Paper 6

Question 7

The point A, with coordinates (0, a, b) lies on the line l₁, which has equation r = 6i + 19j - k + λ(i + 4j - 2k). (a) Find the values of a and b. The point P lie... show full transcript

Worked Solution & Example Answer:The point A, with coordinates (0, a, b) lies on the line l₁, which has equation r = 6i + 19j - k + λ(i + 4j - 2k) - Edexcel - A-Level Maths Pure - Question 7 - 2006 - Paper 6

Step 1

Find the values of a and b.

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Answer

To find the coordinates of point A, we start by equating the equations of the line. The coordinates (0, a, b) must satisfy the line equation:

From the line equation, we set:

The x-coordinate: 0 = 6 + λ
The y-coordinate: a = 19 + 4λ
The z-coordinate: b = -1 - 2λ

From the x-coordinate equation, we solve for λ:

$ext{Solving } 0 = 6 + λ ext{ gives } λ = -6.$

Substituting λ into the other equations:

For 'a': $a = 19 + 4(-6) = 19 - 24 = -5.$
For 'b': $b = -1 - 2(-6) = -1 + 12 = 11.$

Thus, the values are:

a = -5
b = 11.

Step 2

Find the position vector of point P.

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Answer

Next, we need to find the position vector of point P. As given, OP is perpendicular to l₁. The direction vector of the line l₁ is obtained from the given line equation:

Direction vector, d = (1, 4, -2).

For OP to be perpendicular to l₁, their dot product must equal zero:

Let OP = (x, y, z), then:

$ext{If } OP = (6 - λ, 19 + 4λ, -1 - 2λ), ext{ we can substitute } λ = -6.$

This results in:

$ext{Thus, OP = (6 - (-6), 19 + 4(-6), -1 - 2(-6)) = (12, -5, 11)}.$

Therefore, the position vector of point P is:

$P = 2i + 3j + 7k.$

Step 3

show that the points A, P and B are collinear and find the ratio AP : PB.

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Answer

To show that points A, P, and B are collinear, we need to check if the vectors AP and PB are scalar multiples of each other.

Vector AP can be found as:

$AP = P - A = (2i + 3j + 7k) - (0i - 5j + 11k) = 2i + 8j - 4k.$

Vector PB can be calculated from:

$B - P = (5i + 15j + 1k) - (2i + 3j + 7k) = (5 - 2)i + (15 - 3)j + (1 - 7)k = 3i + 12j - 6k.$

Next, to check for collinearity, we check if there exists a scalar k such that:

2 = 3k, \ 8 = 12k, \ -4 = -6k.$$ From the first equation: \ $$k = rac{2}{3}.$$ From the second equation: \ $$k = rac{8}{12} = rac{2}{3}.$$ And from the third equation: $$k = rac{4}{6} = rac{2}{3}.$$ As k is consistent across the equations, points A, P, and B are collinear. Finally, the ratio AP : PB can be found as: $$AP: PB = 2:3.$$

The point A, with coordinates (0, a, b) lies on the line l₁, which has equation r = 6i + 19j - k + λ(i + 4j - 2k) - Edexcel - A-Level Maths Pure - Question 7 - 2006 - Paper 6

Worked Solution & Example Answer:The point A, with coordinates (0, a, b) lies on the line l₁, which has equation r = 6i + 19j - k + λ(i + 4j - 2k) - Edexcel - A-Level Maths Pure - Question 7 - 2006 - Paper 6

Find the values of a and b.

Find the position vector of point P.

show that the points A, P and B are collinear and find the ratio AP : PB.

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