Name : _______________________ __________________________________ ______________________ ________________ _____ Form : 2____________________ 2____________ ________ PYTHAGORAS’ THEOREM (MT F2) The paper consists of 8 subjective questions. Show all your work.
2/2 1.
3.
E
U T
O
Q
15 cm
P V
R
S
F
G 14 cm
H
The diagram above shows a circle with O as the centre. OPRV is a rectangle. Given that
Given that
EH of EF in cm.
OP = 12 cm and UR = 10 cm, the length of VS, in cm, is
2.
U
EG
=
4 5
, find the length
4. 6 cm T
S 5 cm
V T
S P
10 cm
Q
5 cm P 12 cm Q
R
In the diagram above, PQST is a trapezium. RS is 4 cm. The area of the shaded region, in cm 2, is
Given that PTUV is a rhombus, QRST is a square and UTQ and PQR are straight lines. The perimeter of the whole diagram , in cm, is
~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~ 1/2 Prepared by Ms Hafiza Akmal Yusoff
Name : _______________________ __________________________________ ______________________ ________________ _____ Form : 2____________________ 2____________ ________ 5.
U
7.
P
T 15 cm
V
2.4 m S
11 cm
R cm
3m Q
S
15 cm
R Diagram above shows PSQ is a straight line. Given that RS = 2.5 m, and SPR is a right-angled triangle. Calculate the length, in m, of QS.
In diagram above, RSTU is a trapezium and RVS is a right-angled triangle. Calculate the area of the shaded region.
6.
P
Q
R
8.
K 3m L
U V T
S
16 cm In diagram above, PRST and PQVU are rectangle. Q and U are midpoints of PR and PT respectively. TR is 20 cm. Calculate the area of the t he shaded region.
6m
M
8m
N
4m P
Diagram above shows KLM and MNP are straight lines. The perimeter of the shaded region, in m is
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