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Presentation transcript:

General Information Content

Main Menu Next page

Main Menu Next page Previous page

Form 4 students (band 1) Lecturing in one lesson Target Audience: Type of Software: Main Menu Previous page

Content Main Menu Review Angle in semi-circle Angle in the same segment Exercise

What is the relationship between the a and b? b = 2a  at centre twice  at circumference a b O Hint : O is the centre. Content

A B O C Given: In a circle, O is centre. AB is diameter  AOB = 180 o  ACB = 90 o Content Next page

O 135  120  45  75  150  105  165  90  60  15  30  00 180  Protractor Made in China 135  120  45  75  150  105  165  90  60  15  30  00 180  Protractor Made in China A B C C’  ACB =  AC ’B=90 o Content Next page Previous page

AB is a diameter. Find  CAB. AB C 30  Solutions:  BCA = 90  ( in semi-circle )  CAB +  ABC +  BCA = 180  (  s  s sum of )  CAB + 30  + 90  = 180   CAB = 60  Content Next page Previous page

Given that AC = 6 and BC = 8. Find the radius of the circle. Solutions: AB 2 = AC 2 + BC 2 = AB= 10 ( the converse of  in semi-circle ) AB C 68 Since  BCA = 90 , AB is a diameter.  radius = 10  2 = 5 Content Previous page

Is  ACB =  AC’B ? Given: AB is not a diameter, just a chord. A B C’ C Content Next page

A B C’ C We try to rotate the  ABC’ the  ABC’ C’ Content Next page Previous page

A B C’ C O  AOB = ACB (  at centre twice  at circumference)  AOB = AC’B   ACB=  AC’B O is the centre of circle Content Next page Previous page

Find x. Solutions: Besides, x =  PQT (  sum of  )  PQT = 180    QTP   TPQ P R Q 40  95  x S T = 180   95   40  = 45  (  in same segment ) = 45  Content Next page Previous page

Given that TP = TS. Find y. Solutions: (  sum of  )  TPS +  TSP +  QPT +  SQP = 180  y + y + 55  + 45  = 180  2y = 80  (  in same segment ) P R Q 45  55  y S T  QPR =  QSR = 55 . Since TP = TS,  TPS =  TSP = y. y = 40  Content Previous page

Question 1 Work Harder Exercises Question 2 Question 3 Question 4 Question 5 Ans 1 Ans 2 Ans 4 Ans 3 Ans 5 Content

35  x Exercise One Find x. 90  55  45  65  35 

AB=8 and Radius=5. Find x x A B C Exercise Two

30  x Find x. 40  55  50  30  70  100  Exercise Three

60  x Find x. 60  50  45  65  100  140  Exercise Four

Exercise Five 40  x Find x. 90  55  45  50  40 

Exercises

35  x Exercise One Find x. 90  55  45  65  35  Exercises

AB=8 and Radius=5. Find x x A B C Exercise Two Exercises

30  x Find x. 40  55  50  30  70  100  Exercise Three Exercises

60  x Find x. 60  50  45  65  100  140  Exercise Four Exercises

Exercise Five 40  x Find x. 90  55  45  50  40  Exercises