logging in or signing up MATH PPT juliette21 Download Post to : URL : Related Presentations : Share Add to Flag Embed Email Send to Blogs and Networks Add to Channel Uploaded from authorPOINT lite Insert YouTube videos in PowerPont slides with aS Desktop Copy embed code: (To copy code, click on the text box) Embed: URL: Thumbnail: WordPress Embed Customize Embed The presentation is successfully added In Your Favorites. Views: 30 Category: Education License: All Rights Reserved Like it (0) Dislike it (0) Added: April 10, 2011 This Presentation is Public Favorites: 0 Presentation Description No description available. Comments Posting comment... Premium member Presentation Transcript How do we prove that the angle at the centre is twice the angle at the circumference?: How do we prove that the angle at the centre is twice the angle at the circumference?Slide 2: O P B C A Y With the given diagram, we draw a line OP and a line OC , where AC is the diameter of the circle. Since,Slide 3: O P B C A Y We know that AO = OC = OP = OB, because the radii of a circle are all equal. We can then identify all the isosceles triangles. Also,Now, we are ready to solve!: Now, we are ready to solve!Slide 5: O B C A Y Let’s look at AOB. AOB lies on the diameter of the circle. Therefore, we can say that AOB = 180- ( COP + POB). We call that equation 1. 1: AOB = 180 – ( COP + POB) PSlide 6: O B C A Y P 1: AOB = 180 – ( COP + POB) 2: POB = 180 - 2 OPB Now let’s look at angle POB. Angle POB is part of an isosceles triangle POB, where OPB = OBP . Therefore, we can say that POB = 180 – (OPB+ OBP) Or POB = 180 - 2 OPBSlide 7: 1: AOB = 180 – ( COP + POB ) 2: POB = 180 - 2 OPB Given the 2 equations, we’ll substitute equation 2 into equation 1. AOB = 180 – ( COP + 180 - 2 OPB ) = 180 – 180 - COP + 2 OPB = 2 OPB - COP And… TADA!!! We have our 3 rd equation formed!Slide 8: O B C A Y P Getting back to our circle, We know that OPB = OPA + APB Simple. No explanation needed:D And that will be equation 4! 3: AOB = 2 OPB - COP 4: OPB = OPA + APBSlide 9: 3: AOB = 2 OPB - COP 4: OPB = OPA + APB Of course then, the next step will be to substitute 4 into 3! AOB = 2 (OPA + APB ) - COP = 2 OPA + 2 APB - COP 2 OPA + 2 APB - COP + AOB = 0 And here, we have our equation 5!!! 5: 2 OPA + 2 APB - COP + AOB = 0 Alright, back to the circle.Slide 10: O B C A Y P We know that AOP is an isoceles triangle where OAP = OPA Therefore, we can say that AOP + 2 OPA = 180 However, we also know that AOP + COP = 180 (Angles on a straight line) Thus, we can see that 2 OPA = COP (Which will be equation 6!) *This is also a property of triangles, where the sum of 2 interior opposite s = the exterior . 5: 2 OPA + 2 APB - COP + AOB = 0 6: 2 OPA = COPSlide 11: 5: 2 OPA + 2 APB - COP + AOB = 0 6: 2 OPA = COP Again, we substitute equation 6 into 5. 2 OPA + 2 APB - 2 OPA + AOB = 0 2 APB - AOB = 0 2 APB = AOB And…..VIOLA!!!!: VIOLA!!!!Slide 13: We’ve proven that AOB is twice APB , where AOB is an at the centre, and APB is an at the circumference. Conclusion: Angle at the centre is twice angle at the circumference. O B C A Y PSlide 14: A simple mathematical proof brought to you by JH301 Math Group C Credits: Mr Christopher Cheng Miss Maureen Ng You do not have the permission to view this presentation. In order to view it, please contact the author of the presentation.
MATH PPT juliette21 Download Post to : URL : Related Presentations : Share Add to Flag Embed Email Send to Blogs and Networks Add to Channel Uploaded from authorPOINT lite Insert YouTube videos in PowerPont slides with aS Desktop Copy embed code: (To copy code, click on the text box) Embed: URL: Thumbnail: WordPress Embed Customize Embed The presentation is successfully added In Your Favorites. Views: 30 Category: Education License: All Rights Reserved Like it (0) Dislike it (0) Added: April 10, 2011 This Presentation is Public Favorites: 0 Presentation Description No description available. Comments Posting comment... Premium member Presentation Transcript How do we prove that the angle at the centre is twice the angle at the circumference?: How do we prove that the angle at the centre is twice the angle at the circumference?Slide 2: O P B C A Y With the given diagram, we draw a line OP and a line OC , where AC is the diameter of the circle. Since,Slide 3: O P B C A Y We know that AO = OC = OP = OB, because the radii of a circle are all equal. We can then identify all the isosceles triangles. Also,Now, we are ready to solve!: Now, we are ready to solve!Slide 5: O B C A Y Let’s look at AOB. AOB lies on the diameter of the circle. Therefore, we can say that AOB = 180- ( COP + POB). We call that equation 1. 1: AOB = 180 – ( COP + POB) PSlide 6: O B C A Y P 1: AOB = 180 – ( COP + POB) 2: POB = 180 - 2 OPB Now let’s look at angle POB. Angle POB is part of an isosceles triangle POB, where OPB = OBP . Therefore, we can say that POB = 180 – (OPB+ OBP) Or POB = 180 - 2 OPBSlide 7: 1: AOB = 180 – ( COP + POB ) 2: POB = 180 - 2 OPB Given the 2 equations, we’ll substitute equation 2 into equation 1. AOB = 180 – ( COP + 180 - 2 OPB ) = 180 – 180 - COP + 2 OPB = 2 OPB - COP And… TADA!!! We have our 3 rd equation formed!Slide 8: O B C A Y P Getting back to our circle, We know that OPB = OPA + APB Simple. No explanation needed:D And that will be equation 4! 3: AOB = 2 OPB - COP 4: OPB = OPA + APBSlide 9: 3: AOB = 2 OPB - COP 4: OPB = OPA + APB Of course then, the next step will be to substitute 4 into 3! AOB = 2 (OPA + APB ) - COP = 2 OPA + 2 APB - COP 2 OPA + 2 APB - COP + AOB = 0 And here, we have our equation 5!!! 5: 2 OPA + 2 APB - COP + AOB = 0 Alright, back to the circle.Slide 10: O B C A Y P We know that AOP is an isoceles triangle where OAP = OPA Therefore, we can say that AOP + 2 OPA = 180 However, we also know that AOP + COP = 180 (Angles on a straight line) Thus, we can see that 2 OPA = COP (Which will be equation 6!) *This is also a property of triangles, where the sum of 2 interior opposite s = the exterior . 5: 2 OPA + 2 APB - COP + AOB = 0 6: 2 OPA = COPSlide 11: 5: 2 OPA + 2 APB - COP + AOB = 0 6: 2 OPA = COP Again, we substitute equation 6 into 5. 2 OPA + 2 APB - 2 OPA + AOB = 0 2 APB - AOB = 0 2 APB = AOB And…..VIOLA!!!!: VIOLA!!!!Slide 13: We’ve proven that AOB is twice APB , where AOB is an at the centre, and APB is an at the circumference. Conclusion: Angle at the centre is twice angle at the circumference. O B C A Y PSlide 14: A simple mathematical proof brought to you by JH301 Math Group C Credits: Mr Christopher Cheng Miss Maureen Ng