Higher Revision WUQ

1. Higher Revision WUQ

2. 1. Find Equation of tangent to the curve y = 4cos(2x – π/4) at x = π/2 2. For equation tx2 + (t + 10)x + 18 = 0, find the values of t where equation has equal roots. 3. A(2, 5, 9) B(4, 8, 12) C(5, 7, 14) are vertices of triangle ABC. Find size of LBAC

3. 1. Find Equation of tangent to the curve y = 4cos(2x – π/4) at x = π/2 Need point and gradient gradient Let y = 4cosU where U = 2x – π/4 dy/du = 4sinU dU/dx = 2 dy/dx = 4sinU 2 = 8sinU = 8sin(2x – π/4) For gradient sub x = π/2 Find derivative m = 8sin(2 (π/2) – π/4) m = 8sin (3π/4) = 8(1/√2) = 8/√2

4. 1. Find Equation of tangent to the curve y = 4cos(2x – π/4) at x = π/2 Need point and gradient gradient Let y = 4cosU where U = 2x – π/4 dy/du = 4sinU dU/dx = 2 dy/dx = 4sinU 2 = 8sinU = 8sin(2x – π/4) For gradient sub x = π/2 Find derivative m = 8sin(2 (π/2) – π/4) m = 8sin (3π/4) = 8(1/√2) = 8/√2

5. 1. Find Equation of tangent to the curve y = 4cos(2x – π/4) at x = π/2 Need point and gradient sub x = π/2 into equation y = 4cos(2(π/2) – π/4) = 4cos(3π/4) = -4/√2 Use y – b = m(x – a), where m = 8/√2 and (a , b) =(π/2 , -4/√2)

6. 2. For equation tx2 + (t + 10)x + 18 = 0, find the values of t where equation has equal roots. For equal roots b2 – 4ac = 0 a = t, b = t + 10, c = 18 (t + 10)2 – 4(t)(18) = 0 t2 + 20t + 100 – 72t = 0 t2 – 52t + 100 = 0 (t – 2)(t – 50) = 0 t = 2, t = 50

7. B (4,8,12) 3. A(2, 5, 9) B(4, 8, 12) C(5, 7, 14) are vertices of triangle ABC. Find size of LBAC = b – a AB A ( ) ( ) 2 5 9 4 8 12 – = (2,5,9) C ( ) (5,7,14) 2 3 3 = = c – a AC a.b Cosϴ = ( ) ( ) 2 5 9 5 7 14 |a| |b| – = ( ) Need AB and AC 3 2 5 =

8. 3. A(2, 5, 9) B(4, 8, 12) C(5, 7, 14) are vertices of triangle ABC. Find size of LBAC = b – a AB AB.AC = 2(3) + 3(2) + 3(5) ( ) ( ) 2 5 9 4 8 12 = 27 – = ( ) AB = √(22 + 32 + 32) = √22 2 3 3 = AC = √(32 + 22 + 52) = √38 = c – a AC Cosϴ = 27 ( ) =0.9338 ( ) 2 5 9 5 7 14 – = √22√38 ( ) ϴ = 21.00 3 2 5 =