Mathematics • Year 7 • Unit 3 • Lesson 4
The Angle Sum of Triangles
Build fluency with the rule: the three interior angles of any triangle add to 180°. Find unknown angles by subtraction, find equal base angles of an isosceles triangle, and solve algebraic angle problems like x + 2x + 30 = 180. Always state (angle sum of △).
1. I do, fully worked example
Read every line, each step uses the 180° rule and ends with a clearly stated reason.
Problem. Two angles of a triangle are 48° and 76°. Find the third angle.
Step 1, State the rule.
Sum of interior angles of any triangle = 180°
Reason: angle sum of △.
Step 2, Add the two known angles.
48 + 76 = 124°
Step 3, Subtract from 180°.
180 − 124 = 56° (angle sum of △)
Check: 48 + 76 + 56 = 180° ✓.
Answer: The third angle is 56°.
2. We do, fill in the missing steps
Faded working, fill the blanks. 4 marks
Problem. An isosceles triangle has an apex angle of 34°. Find the two base angles.
Step 1, Let each base angle be B and set up the equation:
34 + B + B = _______ (angle sum of △)
34 + 2B = _______
Step 2, Solve for 2B:
2B = 180 − ______ = ______
Step 3, Solve for B:
B = ______ ÷ 2 = ______°
Step 4, Check: 34 + ______ + ______ = 180° ✓
3. You do, independent practice
Always state (angle sum of △) next to your final calculation. Show your working.
Foundation, single subtraction
3.1 Two angles of a triangle are 70° and 60°. Find the third. 1 mark
3.2 Two angles of a triangle are 90° and 45°. Find the third. 1 mark
3.3 Two angles of a triangle are 110° and 25°. Find the third. 1 mark
3.4 An equilateral triangle has all three angles equal. Find the size of each. 1 mark
Standard, isosceles and unknowns
3.5 An isosceles triangle has two base angles of 65° each. Find the apex angle. 2 marks
3.6 An isosceles triangle has an apex angle of 80°. Find each base angle. 2 marks
Extension, algebra
3.7 The angles of a triangle are x°, 2x° and 30°. Set up an equation using the angle sum, solve for x, and state all three angles. 3 marks
3.8 Could a triangle have angles 70°, 80° and 40°? Justify with the angle sum. If not, what is wrong? 2 marks
How did this worksheet feel?
What I'll revisit before next class:
Section 2, Isosceles apex 34°
Step 1: 34 + 2B = 180. Step 2: 2B = 180 − 34 = 146. Step 3: B = 146 ÷ 2 = 73°. Step 4: 34 + 73 + 73 = 180° ✓.
3.1-70°, 60°?
180 − 70 − 60 = 50° (angle sum of △).
3.2-90°, 45°?
180 − 90 − 45 = 45° (angle sum of △). (Right isosceles.)
3.3-110°, 25°?
180 − 110 − 25 = 45° (angle sum of △).
3.4, Equilateral, all angles equal
Each angle = 180 ÷ 3 = 60° (angle sum of △).
3.5, Base angles 65° each, find apex
Apex = 180 − 65 − 65 = 50° (angle sum of △).
3.6, Apex 80°, find base angles
Let each base angle = B. Then 80 + 2B = 180 → 2B = 100 → B = 50°. So each base angle is 50° (angle sum of △).
3.7, Angles x°, 2x°, 30°
x + 2x + 30 = 180 (angle sum of △). Combine: 3x + 30 = 180 → 3x = 150 → x = 50. Angles: 50°, 100°, 30°. Check: 50 + 100 + 30 = 180° ✓.
3.8-70°, 80°, 40°?
70 + 80 + 40 = 190°, which is more than 180°. Since the angle sum of any triangle must be exactly 180°, this set of angles cannot form a triangle.