Mr. Ward's Teaching Materials

131. Pythagoras and Finding a Shorter Side

7 min read

131. Pythagoras and Finding a Shorter Side

Learning Intentions

  • Use Pythagoras’ theorem to Solve the length of a shorter side in a right-angled triangle
  • Apply Pythagoras’ theorem to simple worded problems involving an unknown shorter side

Pre-requisite Summary

Worked Examples

Worked Example 1

Find the shorter side of each right-angled triangle:

a) hypotenuse cm, other shorter side cm

b) hypotenuse cm, other shorter side cm

Worked Example 2

Find the shorter side of each right-angled triangle:

a) hypotenuse cm, other shorter side cm

b) hypotenuse cm, other shorter side cm

Worked Example 3

Find the shorter side and give the exact answer first where needed:

a) hypotenuse cm, other shorter side cm

b) hypotenuse cm, other shorter side cm

Worked Example 4

A ladder of length m reaches a wall. The foot of the ladder is m from the wall. Find the height reached on the wall.

Worked Example 5

A rectangle has diagonal cm and length cm. Find the width.

Worked Example 6

A ramp has length m and rises m vertically. Find the horizontal distance covered by the ramp.

Problems

Problem 1

Find the shorter side of each right-angled triangle:

a) hypotenuse cm, other shorter side cm

b) hypotenuse cm, other shorter side cm

Problem 2

Find the shorter side of each right-angled triangle:

a) hypotenuse cm, other shorter side cm

b) hypotenuse cm, other shorter side cm

Problem 3

Find the shorter side and give the exact answer first where needed:

a) hypotenuse cm, other shorter side cm

b) hypotenuse cm, other shorter side cm

Problem 4

A ladder of length m reaches a wall. The foot of the ladder is m from the wall. Find the height reached on the wall.

Problem 5

A rectangle has diagonal cm and length cm. Find the width.

Problem 6

A ramp has length m and rises m vertically. Find the horizontal distance covered by the ramp.

Exercises

Understanding and Fluency

Exercise 1.

Complete each statement:

a) To find a shorter side in a right-angled triangle, subtract the square of the known shorter side from the square of the what?

b) In , the letter represents the ______

c) After subtracting the squares, take the what root to find the missing side

Exercise 2.

Find the missing shorter side:

a) hypotenuse cm, other shorter side cm

b) hypotenuse cm, other shorter side cm

c) hypotenuse cm, other shorter side cm

Exercise 3.

Find the missing shorter side:

a) hypotenuse cm, other shorter side cm

b) hypotenuse cm, other shorter side cm

c) hypotenuse cm, other shorter side cm

Exercise 4.

Find the missing shorter side and give the exact answer first where needed:

a) hypotenuse cm, other shorter side cm

b) hypotenuse cm, other shorter side cm

c) hypotenuse cm, other shorter side cm

Exercise 5.

Find the missing shorter side and give a decimal approximation to decimal places:

a) hypotenuse cm, other shorter side cm

b) hypotenuse cm, other shorter side cm

c) hypotenuse cm, other shorter side cm

Exercise 6.

Find the width of each rectangle:

a) diagonal cm, length cm

b) diagonal cm, length cm

c) diagonal cm, length cm

Exercise 7.

Solve each simple worded problem:

a) A ladder is m long and stands m from a wall. How high up the wall does it reach?

b) A tent support is m long and reaches a point m above the ground. How far is its base from that point directly below?

c) A television screen has diagonal cm and width cm. Find its height.

Exercise 8.

Solve each simple worded problem:

a) A ramp is m long and rises m. Find the horizontal distance.

b) A rectangular garden has diagonal m and one side m. Find the other side.

c) A kite string is m long and the kite is m above the ground. Find the horizontal distance from the person to the point directly below the kite.

Reasoning

Exercise 9.

Explain why the hypotenuse cannot be the side you are solving for when using subtraction to find a shorter side.

Exercise 10.

A student says that if the hypotenuse is cm and one shorter side is cm, then the other shorter side is . Explain the mistake.

Exercise 11.

Noah says that the missing shorter side in a triangle with hypotenuse cm and one side cm is cm. Is he correct? Explain.

Exercise 12.

Explain why you must square the side lengths before subtracting.

Exercise 13.

A student writes that for a triangle with hypotenuse cm and one side cm, the missing side is . Describe the error.

Problem-solving

Exercise 14.

A ladder is m long and its foot is m from a wall. Find the height reached on the wall.

Exercise 15.

A rectangular poster has diagonal cm and one side cm. Find the other side.

Exercise 16.

A ramp is m long and rises m vertically. Find the horizontal distance.

Exercise 17.

A wire runs from the top of a pole to the ground. The wire is m long and the base of the pole is m from the anchor point. Find the height of the pole.

Exercise 18.

A rectangular floor tile has diagonal cm and one side cm. Find the other side.

Exercise 19.

A kite string is m long and the kite is m above the ground. Find the horizontal distance from the flyer to the point directly below the kite.

Potential Misunderstandings

  • Students may subtract the side lengths instead of subtracting their squares
  • Students may forget that the hypotenuse is the longest side
  • Students may use the wrong side as the hypotenuse
  • Students may add the squares instead of subtracting when finding a shorter side
  • Students may forget to take the square root after subtracting
  • Students may try to subtract before squaring
  • Students may confuse finding a shorter side with finding the hypotenuse
  • Students may ignore units in worded problems
  • Students may not Recognise right-angled triangles hidden inside rectangles or practical situations

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