This file contains; 1.This slide 2.One slide of questions based on using Pythagoras 3.One slide of questions based on using standard trigonometry 4.One.

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Presentation transcript:

This file contains; 1.This slide 2.One slide of questions based on using Pythagoras 3.One slide of questions based on using standard trigonometry 4.One slide of questions based on using the cosine rule 5.One slide of questions based on using the sine rule 6.One slide of questions based on using the sine rule for area 7.One slide containing answers Slides aren’t titled to make students think further.

Is this triangle drawn accurately? 24 cm 10 cm 28 cm 66 cm 44 cm ? 10 cm 15 cm Height = ? * not a right-angled triangle What is the maximum length umbrella that can fit into a suitcase of these dimensions? 66 cm  44 cm  23 cm 23 cm

20 cm ? 30  2 ?? a b c d The graph of y = sinx is shown below. What are the coordinates of a, b, c and d ? BC AD ABCD is a parallelogram. AX = 4 cm BC = 8 cm  BAD = 48  Calculate the length of the longer diagonal. X

10 cm 100  20 cm ? 10 cm ? 20 cm 30 cm 10 cm 70  20 cm ? In the triangle PQR, PQ = 4 cm QR = 5 cm  PQR = 225  Calculate the length of PR. Drawn accurately?

10 cm 30  75  ? 10 cm 30  ? 20 cm 10 cm 20  60  ? 10 cm 20  ? 15 cm

75  20 cm Area = ? 20 cm 75  15 cm Area = ? 20 cm ? 25 cm Area = 200 cm 2 15 cm ? 20 cm Give both possible answers

Answers Pythagoras (the one with the suitcase) 1.No, ≠ 28 2  non RA cm 3.(5√7)/2 ≈ cm (same answer as question 2) Standard Trig (the one with the sin graph) 1.(20√3)/3 ≈ ° cm 4.(90, 1), (180,0), (270,-1), (540,0) Cosine Rule (one with the worded question) cm 2.180°  not a triangle (check the lengths) cm 4.(41+20√2) ½ ≈ 8.32 cm Sine Rule 1.5√6+5√2 ≈ cm 2.90° cm ° Sine Rule for Area (one about areas) 1.60° 2.(75√6+75√2)/2 ≈ cm cm and cm cm 2