Equations Perpendicular Lines Higher GCSE Questions These questions

  • Slides: 15
Download presentation
Equations – Perpendicular Lines – Higher – GCSE Questions These questions are the same

Equations – Perpendicular Lines – Higher – GCSE Questions These questions are the same format as previous GCSE exams. COPY means they use the exact same numbers as the original GCSE question. Otherwise, they are clone questions using different numbers. The worksheets are provided in a variety of sizes.

Printing To print handouts from slides Select the slide from the left. Then click:

Printing To print handouts from slides Select the slide from the left. Then click: File > Print > ‘Print Current Slide’ To print multiple slides Click on a section title to highlight all those slides, or press ‘Ctrl’ at the same time as selecting slides to highlight more than one. Then click: File > Print > ‘Print Selection’ To print double-sided handouts Highlight both slides before using ‘Print Selection’. Choose ‘Print on Both Sides’ and ‘Flip on Short Edge’.

GCSE 1 Edexcel Higher: May 2017 Paper 1, Q 18 1 y Edexcel Higher:

GCSE 1 Edexcel Higher: May 2017 Paper 1, Q 18 1 y Edexcel Higher: May 2017 Paper 1, Q 18 y A B C O GCSE A B D C x O D x (Total for Question 1 is 4 marks)

GCSE Edexcel Higher: November 2017 Paper 1, Q 19 L 1 y A A

GCSE Edexcel Higher: November 2017 Paper 1, Q 19 L 1 y A A E D E O B x D M O B x M C C ABCD is a rectangle. A, E and B are points on the straight line L with equation x + 2 y = 12 A and D are points on the straight line M. AE = EB Find an equation for M. (Total for Question 1 is 4 marks)

GCSE 1 Edexcel Higher: May 2018 Paper 1, Q 19 GCSE 1 The point

GCSE 1 Edexcel Higher: May 2018 Paper 1, Q 19 GCSE 1 The point T has coordinates (5, 7) The point R has coordinates (a, b) Edexcel Higher: May 2018 Paper 1, Q 19 The point T has coordinates (5, 7) The point R has coordinates (a, b) A line perpendicular to TR is given by the equation 5 x + 3 y = 10 Find an expression for b in terms of a (Total for Question 1 is 5 marks)

GCSE 1 Edexcel Higher: May 2017 Paper 1, Q 18 y A B C

GCSE 1 Edexcel Higher: May 2017 Paper 1, Q 18 y A B C O D x (Total for Question 1 is 4 marks)

GCSE Edexcel Higher: November 2017 Paper 1, Q 19 L 1 y A E

GCSE Edexcel Higher: November 2017 Paper 1, Q 19 L 1 y A E D O B x M C ABCD is a rectangle. A, E and B are points on the straight line L with equation x + 2 y = 12 A and D are points on the straight line M. AE = EB Find an equation for M. (Total for Question 1 is 4 marks)

GCSE 1 Edexcel Higher: May 2018 Paper 1, Q 19 The point T has

GCSE 1 Edexcel Higher: May 2018 Paper 1, Q 19 The point T has coordinates (5, 7) The point R has coordinates (a, b) A line perpendicular to TR is given by the equation 5 x + 3 y = 10 Find an expression for b in terms of a (Total for Question 1 is 5 marks)

GCSE 1 Edexcel Higher: May 2017 Paper 1, Q 18 y 12 A B

GCSE 1 Edexcel Higher: May 2017 Paper 1, Q 18 y 12 A B D C O x 6 Diagonals of a rhombus are perpendicular. Equation of BD: y = -2 x + c B; (6, 12), x = 6, y = 12 12 = (-2 x 6) + c 12 = -12 + c 24 = c y = -2 x + 24 (Total for Question 1 is 4 marks)

GCSE Edexcel Higher: November 2017 Paper 1, Q 19 L 1 y (0, 6)

GCSE Edexcel Higher: November 2017 Paper 1, Q 19 L 1 y (0, 6) (-12, 12)A E O D x B (12, 0) M C ABCD is a rectangle. A, E and B are points on the straight line L with equation x + 2 y = 12 A and D are points on the straight line M. AE = EB Find an equation for M. x + 2 y = 12 y = 0, x = 12 x = 0, y = 6 Distance from E to A is the same as from B to E. (left 12 , up 6) = A: (-12, 12) y = 2 x + c 12 = (2 × -12) + c 12 = -24 + c 36 = c y = 2 x + 36 (Total for Question 1 is 4 marks)

GCSE 1 Edexcel Higher: May 2018 Paper 1, Q 19 The point T has

GCSE 1 Edexcel Higher: May 2018 Paper 1, Q 19 The point T has coordinates (5, 7) The point R has coordinates (a, b) A line perpendicular to TR is given by the equation 5 x + 3 y = 10 Find an expression for b in terms of a Rearrange Gradient of perpendicular line = negative reciprocal Equation of TR Substitute (5, 7) Substitute (a, b) (Total for Question 1 is 5 marks)

Questions? Comments? Suggestions? …or have you found a mistake!? Any feedback would be appreciated

Questions? Comments? Suggestions? …or have you found a mistake!? Any feedback would be appreciated . Please feel free to email: tom@goteachmaths. co. uk