Advanced Trigonometry

Higher Maths 2 3 Advanced Trigonometry UNIT OUTCOME SLIDE

Basic Trigonometric Identities NOTE SLIDE Higher Maths 2 3 Advanced Trigonometry UNIT OUTCOME There are several basic trigonometric facts or identities which it is important to remember. ( sin x ) 2 is written sin 2 x sin 2 x + cos 2 x = 1 cos 2 x = 1 – sin 2 x tan x = sin x cos x Alternatively, Example Find tan x if sin x = cos 2 x = 1 – sin 2 x = 1 – = 5 9 cos x = tan x = 2 sin 2 x = 1 – cos 2 x 2 3 ÷ = 3 5 5 3 5 4 9 2 3 LEARN THESE...

Compound Angles NOTE SLIDE Higher Maths 2 3 Advanced Trigonometry UNIT OUTCOME An angle which is the sum of two other angles is called a Compound Angle. q b a f l Angle Symbols Greek letters are often used for angles. ‘ Alpha ’ ‘ Beta ’ ‘ Theta ’ ‘ Phi ’ ‘ Lambda ’ B C A BAC = a b BAC is a compound angle. sin ( ) sin + sin + a b + a b ≠ IMPORTANT a b

sin ( ) Formula for NOTE SLIDE UNIT OUTCOME By extensive working, it is possible to prove that + sin ( ) + sin + sin ≠ Higher Maths 2 3 Advanced Trigonometry Example Find the exact value of sin 75 ° sin 75 ° = sin ( 45 ° + 30 ° ) = sin 45 ° cos 30 ° + sin 30 ° cos 45 ° = 2 3 1 2 × + × = 2 2 + 1 2 1 3 2 1 a b IMPORTANT a b a b sin ( ) = sin cos + sin cos a b + a b b a

Compound Angle Formulae NOTE SLIDE UNIT OUTCOME sin ( ) = sin cos + sin cos a b + a b b a Higher Maths 2 3 Advanced Trigonometry sin ( ) = sin cos – sin cos a b – a b b a cos ( ) = cos cos – sin sin a b + a b b a cos ( ) = cos cos + sin sin a b – a b b a The result for sin ( ) a b + can be used to find all four basic compound angle formulae. a b CAREFUL!

Proving Trigonometric Identities NOTE SLIDE UNIT OUTCOME Higher Maths 2 3 Advanced Trigonometry Example Prove the identity sin ( ) a b + cos a b cos tan a + b tan = sin ( ) a b + cos a b cos = cos a b cos sin a b cos + sin a b cos = cos a b cos sin a b cos + sin a b cos cos a b cos = cos a sin a + sin b b cos = tan a + b tan An algebraic fact is called an identity . tan x sin x cos x = ‘ Left Hand Side’ L.H.S. R.H.S. ‘ Right Hand Side’ REMEMBER

Applications of Trigonometric Addition Formulae NOTE SLIDE UNIT OUTCOME Higher Maths 2 3 Advanced Trigonometry From the diagram, show that cos ( ) a b – = 2 5 5 KL = 8 2 + 4 2 80 = = 4 5 JK = 3 2 + 4 2 25 = = 5 Example cos ( ) a b – = cos a b cos + sin a b sin = 5 1 5 × + × 3 4 2 5 5 10 5 5 = = 2 5 2 5 5 = cos a = 4 5 4 1 5 = sin a = 8 5 4 2 5 = Find any unknown sides: a b K L J M 8 3 4

Investigating Double Angles NOTE SLIDE UNIT OUTCOME Higher Maths 2 3 Advanced Trigonometry The sum of two identical angles can be written as and is called a double angle . a 2 a 2 sin = sin ( + ) a a = a a cos + sin a a cos sin = 2 sin a a cos a 2 cos = cos ( + ) a a = a a cos – cos a a sin sin = cos 2 a – sin 2 a = cos 2 a – ( 1 – cos 2 ) a = cos 2 a – 1 2 or sin 2 a – 1 2 sin 2 x + cos 2 x = 1 sin 2 x = 1 – cos 2 x a a REMEMBER

( ) Double Angle Formulae NOTE SLIDE UNIT OUTCOME Higher Maths 2 3 Advanced Trigonometry There are several basic identities for double angles which it is useful to know. sin 2 = 2 sin cos a a a cos 2 = cos 2 – sin 2 a a a = 2 cos 2 – 1 a = 1 – 2 sin 2 a Example 3 4 If tan = , calculate and . q 3 4 q 5 q sin 2 q cos 2 q sin 2 = 2 sin cos q q = 2 × 5 4 × 5 3 = 25 24 q cos 2 = cos 2 – sin 2 q = 5 3 – = 25 7 q 2 ( ) 5 4 2 – tan q = adj opp LEARN THESE...

Trigonometric Equations involving Double Angles NOTE SLIDE UNIT OUTCOME Higher Maths 2 3 Advanced Trigonometry cos 2 x – cos x = 0 Solve for 0 x 2 π cos 2 x – cos x = 0 2 cos 2 x – 1 – cos x = 0 2 cos 2 x – cos x – 1 = 0 ( 2 cos x + 1 ) ( cos x – 1 ) = 0 cos x – 1 = 0 cos x = 1 x = 2 π 2 cos x + 1 = 0 cos x = 2 1 –  S A T 3 π x = C  3 π 4 3 π 2 or x = x = 0 or or substitute remember Example FACTORISE!

Intersection of Trigonometric Graphs NOTE SLIDE UNIT OUTCOME Higher Maths 2 3 Advanced Trigonometry y x 4 -4 360 ° A B f ( x ) g ( x ) Example The diagram opposite shows the graphs of and . g ( x ) f ( x ) Find the x - coordinate of A and B. 4 sin 2 x = 2 sin x 4 sin 2 x – 2 sin x = 0 4 × ( 2 sin x cos x ) – 2 sin x = 0 8 sin x cos x – 2 sin x = 0 2 sin x ( 4 cos x – 1 ) = 0 common factor f ( x ) = g ( x ) 2 sin x = 0 4 cos x – 1 = 0 or x = 0 ° , 180 ° or 360 ° or x ≈ 75.5 ° or 284.5 ° Solving by trigonometry,

Quadratic Angle Formulae NOTE SLIDE UNIT OUTCOME Higher Maths 2 3 Advanced Trigonometry The double angle formulae can also be rearranged to give quadratic angle formulae. cos 2 a = 2 1 ( 1 + cos 2 ) a sin 2 a = 2 1 ( 1 – cos 2 ) a Example Express in terms of cos 2 x . 2 cos 2 x – 3 sin 2 x 2 × ( 1 + cos 2 x ) – 3 × ( 1 – cos 2 x ) 2 1 2 1 1 + cos 2 x – + cos 2 x 2 3 2 3 2 5 2 1 – + cos 2 x = = = = 2 1 ( 5 cos 2 x – 1 ) substitute Quadratic means ‘ squared ’ 2 cos 2 x – 3 sin 2 x

Angles in Three Dimensions NOTE SLIDE UNIT OUTCOME Higher Maths 2 3 Advanced Trigonometry In three dimensions, a flat surface is called a plane . Two planes at different orientations have a straight line of intersection . A B C D P Q J L K The angle between two planes is defined as perpendicular to the line of intersection.

S Three Dimensional Trigonometry NOTE SLIDE UNIT OUTCOME Higher Maths 2 3 Advanced Trigonometry Challenge P Q R T O M N 8m 6m Many problems in three dimensions can be solved using Pythagoras and basic trigonometry skills. Find all unknown angles and lengths in the pyramid shown above. 9m O S H × ÷ ÷ A C H × ÷ ÷ O T A × ÷ ÷

Advanced Trigonometry

Empfohlen

Empfohlen

Weitere ähnliche Inhalte

Was ist angesagt?

Was ist angesagt? (20)

Andere mochten auch

Andere mochten auch (6)

Ähnlich wie Advanced Trigonometry

Ähnlich wie Advanced Trigonometry (20)

Mehr von timschmitz

Mehr von timschmitz (11)

Kürzlich hochgeladen

Kürzlich hochgeladen (20)

Advanced Trigonometry