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Date May 2011 Marks available 2 Reference code 11M.1.sl.TZ1.7
Level SL only Paper 1 Time zone TZ1
Command term Calculate Question number 7 Adapted from N/A

Question

A room is in the shape of a cuboid. Its floor measures \(7.2\) m by \(9.6\) m and its height is \(3.5\) m.

Calculate the length of AC.

[2]
a.

Calculate the length of AG.

[2]
b.

Calculate the angle that AG makes with the floor.

[2]
c.

Markscheme

\({\text{A}}{{\text{C}}^2} = {7.2^2} + {9.6^2}\)     (M1) 

Note: Award (M1) for correct substitution in Pythagoras Theorem.

 

\({\text{AC}} = 12{\text{ m}}\)     (A1)     (C2)

[2 marks]

a.

\({\text{A}}{{\text{G}}^2} = {12^2} + {3.5^2}\)     (M1) 

Note: Award (M1) for correct substitution in Pythagoras Theorem.

 

\({\text{AG}} = 12.5{\text{ m}}\)     (A1)(ft)     (C2)

Note: Follow through from their answer to part (a).

[2 marks]

b.

\(\tan \theta  = \frac{{3.5}}{{12}}\) or \(\sin \theta  = \frac{{3.5}}{{12.5}}\) or \(\cos \theta  = \frac{{12}}{{12.5}}\)     (M1)

Note: Award (M1) for correct substitutions in trig ratio.

 

\(\theta  = {16.3^ \circ }\)     (A1)(ft)     (C2)

Notes: Follow through from parts (a) and/or part (b) where appropriate. Award (M1)(A0) for use of radians (0.284).

[2 marks]

c.

Examiners report

Question 7 was surprisingly difficult for many candidates, especially part b. Many candidates did not recognize that ACG was a right angled triangle and tried to use the law of cosines to find angle A. Although correct substitution and manipulation provided the correct answer, many candidates attempting this method made arithmetical errors.

a.

Question 7 was surprisingly difficult for many candidates, especially part b. Many candidates did not recognize that ACG was a right angled triangle and tried to use the law of cosines to find angle A. Although correct substitution and manipulation provided the correct answer, many candidates attempting this method made arithmetical errors.

b.

Question 7 was surprisingly difficult for many candidates, especially part b. Many candidates did not recognize that ACG was a right angled triangle and tried to use the law of cosines to find angle A. Although correct substitution and manipulation provided the correct answer, many candidates attempting this method made arithmetical errors.

c.

Syllabus sections

Topic 5 - Geometry and trigonometry » 5.4 » The size of an angle between two lines or between a line and a plane.

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