The line L₁ has equation "1= The line L2 has equation 6 (9) - 3 5 +A6 5 -3 --0-0 = 21 14 -7 Different values of X give different points on line L₁. Similarly, different values of μ give different points on line L2. If the two lines intersect then r1 r2 at the point of intersection. If you can find values of A and which satisfy this condition then the two lines intersect. Show the lines intersect by finding these values and hence find the point of intersection. A =

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The line L₁ has equation The line L2 has equation 26 μ = -3 -7 21 6 14 0 Different values of X give different points on line L₁. Similarly, different values of μ give different points on line L2. If the two lines intersect then r1 r₂ at the point of intersection. If you can find values of X and which satisfy this condition then the two lines intersect. Show the lines intersect by finding these values and hence find the point of intersection. λ = ܩܕ "1= sin (a) sin (a) "2 Ә 6 (1) + X 3 9 əx f f əx 5 6 5 +μl ∞ a R Ω Ω E

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Give the position vector of the point of intersection. Click select 3 Rows and 1 Column, and click Insert. This will insert a column vector with 3 entries. ab sin (a) ə f əx ∞ a Ω