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11 X1 T04 14 Products To Sums Etc

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Nigel Simmons
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Products to Sums
Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B )
Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B )
Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B )
Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions
Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x
Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x
Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x = sin ( x + 5 x ) + sin ( x − 5 x )
Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x = sin ( x + 5 x ) + sin ( x − 5 x ) = sin 6 x + sin ( −4 x )
Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x = sin ( x + 5 x ) + sin ( x − 5 x ) = sin 6 x + sin ( −4 x ) = sin 6 x − sin 4 x
Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x = sin ( x + 5 x ) + sin ( x − 5 x ) = sin 6 x + sin ( −4 x ) = sin 6 x − sin 4 x b) cos3θ cos5θ
Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x = sin ( x + 5 x ) + sin ( x − 5 x ) = sin 6 x + sin ( −4 x ) = sin 6 x − sin 4 x 1 = ( 2cos3θ cos5θ ) b) cos3θ cos5θ 2
Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x = sin ( x + 5 x ) + sin ( x − 5 x ) = sin 6 x + sin ( −4 x ) = sin 6 x − sin 4 x 1 = ( 2cos3θ cos5θ ) b) cos3θ cos5θ 2 1 = ( cos ( 3θ + 5θ ) + cos ( 3θ − 5θ ) ) 2
Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x = sin ( x + 5 x ) + sin ( x − 5 x ) = sin 6 x + sin ( −4 x ) = sin 6 x − sin 4 x 1 = ( 2cos3θ cos5θ ) b) cos3θ cos5θ 2 1 = ( cos ( 3θ + 5θ ) + cos ( 3θ − 5θ ) ) 2 1 = ( cos8θ + cos ( −2θ ) ) 2
Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x = sin ( x + 5 x ) + sin ( x − 5 x ) = sin 6 x + sin ( −4 x ) = sin 6 x − sin 4 x 1 = ( 2cos3θ cos5θ ) b) cos3θ cos5θ 2 1 = ( cos ( 3θ + 5θ ) + cos ( 3θ − 5θ ) ) 2 1 1 = ( cos8θ + cos 2θ ) = ( cos8θ + cos ( −2θ ) ) 2 2
(ii) Evaluate 2sin 45o cos15o
(ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 )
(ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o
(ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22
(ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22 3 +1 = 2
(ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22 3 +1 = 2 Sums to Products
(ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22 3 +1 = 2 Sums to Products 1 1 sin A + sin B = 2sin ( A + B ) cos ( A − B ) 2 2
(ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22 3 +1 = 2 Sums to Products 1 1 sin A + sin B = 2sin ( A + B ) cos ( A − B ) (2 sine half sum cos half diff) 2 2
(ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22 3 +1 = 2 Sums to Products 1 1 sin A + sin B = 2sin ( A + B ) cos ( A − B ) (2 sine half sum cos half diff) 2 2 1 1 cos A + cos B = 2cos ( A + B ) cos ( A − B ) 2 2
(ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22 3 +1 = 2 Sums to Products 1 1 sin A + sin B = 2sin ( A + B ) cos ( A − B ) (2 sine half sum cos half diff) 2 2 1 1 cos A + cos B = 2cos ( A + B ) cos ( A − B ) (2 cos half sum cos half diff) 2 2
(ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22 3 +1 = 2 Sums to Products 1 1 sin A + sin B = 2sin ( A + B ) cos ( A − B ) (2 sine half sum cos half diff) 2 2 1 1 cos A + cos B = 2cos ( A + B ) cos ( A − B ) (2 cos half sum cos half diff) 2 2 1 1 cos A − cos B = −2sin ( A + B ) sin ( A − B ) 2 2
(ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22 3 +1 = 2 Sums to Products 1 1 sin A + sin B = 2sin ( A + B ) cos ( A − B ) (2 sine half sum cos half diff) 2 2 1 1 cos A + cos B = 2cos ( A + B ) cos ( A − B ) (2 cos half sum cos half diff) 2 2 1 1 cos A − cos B = −2sin ( A + B ) sin ( A − B ) (minus 2 sine half sum 2 2 sine half diff)
eg (i) Convert into products of trig functions
eg (i) Convert into products of trig functions a ) cos3 A − cos5 A
eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2
eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A )
eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A
eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x
eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x )
eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2
eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x
eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x (ii) Solve sin x + sin 3 x = 0 0o ≤ x ≤ 360o
eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x (ii) Solve sin x + sin 3 x = 0 0o ≤ x ≤ 360o 2sin 2 x cos ( − x ) = 0
eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x (ii) Solve sin x + sin 3 x = 0 0o ≤ x ≤ 360o 2sin 2 x cos ( − x ) = 0 2sin 2 x cos x = 0
eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x (ii) Solve sin x + sin 3 x = 0 0o ≤ x ≤ 360o 2sin 2 x cos ( − x ) = 0 2sin 2 x cos x = 0 sin 2 x = 0 cos x = 0 or
eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x (ii) Solve sin x + sin 3 x = 0 0o ≤ x ≤ 360o 2sin 2 x cos ( − x ) = 0 2sin 2 x cos x = 0 sin 2 x = 0 cos x = 0 or 2 x = 0o ,180o ,360o ,540o ,720o
eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x (ii) Solve sin x + sin 3 x = 0 0o ≤ x ≤ 360o 2sin 2 x cos ( − x ) = 0 2sin 2 x cos x = 0 sin 2 x = 0 cos x = 0 or 2 x = 0o ,180o ,360o ,540o ,720o x = 0o ,90o ,180o , 270o ,360o
eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x (ii) Solve sin x + sin 3 x = 0 0o ≤ x ≤ 360o 2sin 2 x cos ( − x ) = 0 2sin 2 x cos x = 0 sin 2 x = 0 cos x = 0 or x = 90o , 270o 2 x = 0o ,180o ,360o ,540o ,720o x = 0o ,90o ,180o , 270o ,360o
eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x (ii) Solve sin x + sin 3 x = 0 0o ≤ x ≤ 360o 2sin 2 x cos ( − x ) = 0 2sin 2 x cos x = 0 sin 2 x = 0 cos x = 0 or x = 90o , 270o 2 x = 0o ,180o ,360o ,540o ,720o x = 0o ,90o ,180o , 270o ,360o ∴ x = 0o ,90o ,180o , 270o ,360o
Exercise 2F; 1b, 2b, 3a, 9, 10ace

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11 X1 T04 14 Products To Sums Etc

  • 2. Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B )
  • 3. Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B )
  • 4. Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B )
  • 5. Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions
  • 6. Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x
  • 7. Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x
  • 8. Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x = sin ( x + 5 x ) + sin ( x − 5 x )
  • 9. Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x = sin ( x + 5 x ) + sin ( x − 5 x ) = sin 6 x + sin ( −4 x )
  • 10. Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x = sin ( x + 5 x ) + sin ( x − 5 x ) = sin 6 x + sin ( −4 x ) = sin 6 x − sin 4 x
  • 11. Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x = sin ( x + 5 x ) + sin ( x − 5 x ) = sin 6 x + sin ( −4 x ) = sin 6 x − sin 4 x b) cos3θ cos5θ
  • 12. Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x = sin ( x + 5 x ) + sin ( x − 5 x ) = sin 6 x + sin ( −4 x ) = sin 6 x − sin 4 x 1 = ( 2cos3θ cos5θ ) b) cos3θ cos5θ 2
  • 13. Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x = sin ( x + 5 x ) + sin ( x − 5 x ) = sin 6 x + sin ( −4 x ) = sin 6 x − sin 4 x 1 = ( 2cos3θ cos5θ ) b) cos3θ cos5θ 2 1 = ( cos ( 3θ + 5θ ) + cos ( 3θ − 5θ ) ) 2
  • 14. Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x = sin ( x + 5 x ) + sin ( x − 5 x ) = sin 6 x + sin ( −4 x ) = sin 6 x − sin 4 x 1 = ( 2cos3θ cos5θ ) b) cos3θ cos5θ 2 1 = ( cos ( 3θ + 5θ ) + cos ( 3θ − 5θ ) ) 2 1 = ( cos8θ + cos ( −2θ ) ) 2
  • 15. Products to Sums 2sin A cos B = sin ( A + B ) + sin ( A − B ) 2cos A cos B = cos ( A + B ) + cos ( A − B ) 2sin A sin B = cos ( A − B ) − cos ( A + B ) eg (i) Express as a sum or difference of trig functions a ) 2cos5 x sin x = 2sin x cos5 x = sin ( x + 5 x ) + sin ( x − 5 x ) = sin 6 x + sin ( −4 x ) = sin 6 x − sin 4 x 1 = ( 2cos3θ cos5θ ) b) cos3θ cos5θ 2 1 = ( cos ( 3θ + 5θ ) + cos ( 3θ − 5θ ) ) 2 1 1 = ( cos8θ + cos 2θ ) = ( cos8θ + cos ( −2θ ) ) 2 2
  • 16. (ii) Evaluate 2sin 45o cos15o
  • 17. (ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 )
  • 18. (ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o
  • 19. (ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22
  • 20. (ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22 3 +1 = 2
  • 21. (ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22 3 +1 = 2 Sums to Products
  • 22. (ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22 3 +1 = 2 Sums to Products 1 1 sin A + sin B = 2sin ( A + B ) cos ( A − B ) 2 2
  • 23. (ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22 3 +1 = 2 Sums to Products 1 1 sin A + sin B = 2sin ( A + B ) cos ( A − B ) (2 sine half sum cos half diff) 2 2
  • 24. (ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22 3 +1 = 2 Sums to Products 1 1 sin A + sin B = 2sin ( A + B ) cos ( A − B ) (2 sine half sum cos half diff) 2 2 1 1 cos A + cos B = 2cos ( A + B ) cos ( A − B ) 2 2
  • 25. (ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22 3 +1 = 2 Sums to Products 1 1 sin A + sin B = 2sin ( A + B ) cos ( A − B ) (2 sine half sum cos half diff) 2 2 1 1 cos A + cos B = 2cos ( A + B ) cos ( A − B ) (2 cos half sum cos half diff) 2 2
  • 26. (ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22 3 +1 = 2 Sums to Products 1 1 sin A + sin B = 2sin ( A + B ) cos ( A − B ) (2 sine half sum cos half diff) 2 2 1 1 cos A + cos B = 2cos ( A + B ) cos ( A − B ) (2 cos half sum cos half diff) 2 2 1 1 cos A − cos B = −2sin ( A + B ) sin ( A − B ) 2 2
  • 27. (ii) Evaluate 2sin 45o cos15o = sin ( 45 + 15 ) + sin ( 45 − 15 ) = sin 60o + sin 30o 31 = + 22 3 +1 = 2 Sums to Products 1 1 sin A + sin B = 2sin ( A + B ) cos ( A − B ) (2 sine half sum cos half diff) 2 2 1 1 cos A + cos B = 2cos ( A + B ) cos ( A − B ) (2 cos half sum cos half diff) 2 2 1 1 cos A − cos B = −2sin ( A + B ) sin ( A − B ) (minus 2 sine half sum 2 2 sine half diff)
  • 28. eg (i) Convert into products of trig functions
  • 29. eg (i) Convert into products of trig functions a ) cos3 A − cos5 A
  • 30. eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2
  • 31. eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A )
  • 32. eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A
  • 33. eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x
  • 34. eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x )
  • 35. eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2
  • 36. eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x
  • 37. eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x (ii) Solve sin x + sin 3 x = 0 0o ≤ x ≤ 360o
  • 38. eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x (ii) Solve sin x + sin 3 x = 0 0o ≤ x ≤ 360o 2sin 2 x cos ( − x ) = 0
  • 39. eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x (ii) Solve sin x + sin 3 x = 0 0o ≤ x ≤ 360o 2sin 2 x cos ( − x ) = 0 2sin 2 x cos x = 0
  • 40. eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x (ii) Solve sin x + sin 3 x = 0 0o ≤ x ≤ 360o 2sin 2 x cos ( − x ) = 0 2sin 2 x cos x = 0 sin 2 x = 0 cos x = 0 or
  • 41. eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x (ii) Solve sin x + sin 3 x = 0 0o ≤ x ≤ 360o 2sin 2 x cos ( − x ) = 0 2sin 2 x cos x = 0 sin 2 x = 0 cos x = 0 or 2 x = 0o ,180o ,360o ,540o ,720o
  • 42. eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x (ii) Solve sin x + sin 3 x = 0 0o ≤ x ≤ 360o 2sin 2 x cos ( − x ) = 0 2sin 2 x cos x = 0 sin 2 x = 0 cos x = 0 or 2 x = 0o ,180o ,360o ,540o ,720o x = 0o ,90o ,180o , 270o ,360o
  • 43. eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x (ii) Solve sin x + sin 3 x = 0 0o ≤ x ≤ 360o 2sin 2 x cos ( − x ) = 0 2sin 2 x cos x = 0 sin 2 x = 0 cos x = 0 or x = 90o , 270o 2 x = 0o ,180o ,360o ,540o ,720o x = 0o ,90o ,180o , 270o ,360o
  • 44. eg (i) Convert into products of trig functions 1 1 a ) cos3 A − cos5 A = −2sin ( 8 A ) sin ( −2 A ) 2 2 = −2sin 4 A sin ( − A ) = 2sin 4 A sin A b) sin 6 x − sin 4 x = sin 6 x + sin ( −4 x ) 1 1 = 2sin ( 2 x ) cos ( 10 x ) 2 2 = 2sin x cos5 x (ii) Solve sin x + sin 3 x = 0 0o ≤ x ≤ 360o 2sin 2 x cos ( − x ) = 0 2sin 2 x cos x = 0 sin 2 x = 0 cos x = 0 or x = 90o , 270o 2 x = 0o ,180o ,360o ,540o ,720o x = 0o ,90o ,180o , 270o ,360o ∴ x = 0o ,90o ,180o , 270o ,360o
  • 45. Exercise 2F; 1b, 2b, 3a, 9, 10ace