Trigonometric Ratios of Standard Angles

Trigonometric Ratios of Standard Angles

Trigonometric Ratios of Standard Angles

In trigonometry, 0°, 30°, 45°, 60°, 90°, 120°, 135°, 150°, 180° etc. are considered as the standard angles. We can derive the values of trigonometric ratios of standard angles geometrically.

We should remember those values for the calculations in trigonometry. Here is the geometrical procedure for the derivation of trigonometric ratios of standard angles.

Trigonometric ratios of 45°

Let OX be the initial line and trace out an ∠XOP = 45°. From Q, a point on OP, draw QN⊥OX. Then ∠NQO = 90° – 45° = 45°. Therefore it is an isosceles triangle, i.e. ON = NQ. Let ON = NQ = a.

Right angled triangle for the Trigonometric ratios of 45°

From the right angled triangle ONQ, using Pythagoras relation,

OQ² = ON² + NQ²

= a² + a²

= 2a²

∴ OQ = a√2

Now for right angled triangle ONQ with angle of reference ∠NOQ = 45°,

sin45° = "NQ" /"OQ" = "a" /("a" √("2" )) = "1" /√("2" ) cosec45° = "OQ" /"NQ" = ("a" √("2" ))/"a" = √("2" ) cos45° = "ON" /"OQ" = "a" /("a" √("2" )) = "1" /√("2" ) sec45° = "OQ" /"ON" = ("a" √("2" ))/"a" = √("2" ) tan45° = "NQ" /"ON" = "a" /"a" = 1 cot45° = "ON" /"NQ" = "a" /"a" = 1

Trigonometric ratios of 60° and 30°

Let ABC be a triangle in which AB = BC = CA and hence ∠A = ∠B = ∠C = 60°. From A draw AD⊥BC. Then ∠BAD = ∠CAD = 30° and BD = CD. Let AB = BC = CA = 2a. So, BD = CD = a.

Right angled triangle for trigonometric ratios of 60° and 30°

Now, from right angled DABD,

AD² = AB² – BD²

= 4a² – a²

= 3a²

∴ AD = a√3

Now, in right angled DABD with angle of reference ∠ABD = 60°,

Trigonometric ratios of 60°: sin60° = "AD" /"AB" = ("a" √("3" ))/"2a" = √("3" )/"2" cosec60° = "AB" /"AD" = "2a" /("a" √("3" )) = "2" /√("3" ) cos60° = "BD" /"AB" = "a" /"2a" = "1" /"2" sec60° = "AB" /"BD" = "2a" /"a" = 2 tan60° = "AD" /"BD" = ("a" √("3" ))/a = √("3" ) cot60° = "BD" /"AD" = "a" /("a" √("3" )) = "1" /√("3" )

And, with the angle of reference ∠BAD = 30°,

Trigonometric ratios of 30°: Sin30° = "BD" /"AB" = "a" /"2a" = "1" /"2" cosec30° = "AB" /"BD" = "2a" /"a" = 2 cos30° = "AD" /"AB" = ("a" √("3" ))/"2a" = √("3" )/"2" sec30° = "AB" /"AD" = "2a" /("a" √("3" )) = "2" /√("3" ) tan30° = "BD" /"AD" = "a" /("a" √("3" )) = "1" /√("3" ) cot30° = "AD" /"BD" = ("a" √("3" ))/a = √("3" )

Trigonometric ratios of 0°

Let OX be the initial line and trace out an ∠XOP = θ. Let Q be a point on OP. Draw QM⊥OX.

Right angled triangle for the Trigonometric ratios of 0°

When θ is decreased and tends to be 0° keeping OM constant, then QM = 0 and OQ = OM.

Now, from right angled triangle MOQ with angle of reference θ = 0°,

Trigonometric ratios of 0°: sin0° = "QM" /"OQ" = "0" /"OQ" = 0 cosec0° = "OQ" /"QM" = "OQ" /"0" = ∞ (undefined) cos0° = "OM" /"OQ" = "OM" /"OM" = 1 sec0° = "OQ" /"OM" = "OM" /"OM" = 1 tan0° = "QM" /"OM" = "0" /"OM" = 0 cot0° = "OM" /"QM" = "OM" /"0" = ∞ (undefined)

Trigonometric ratios of 90°

Let OX be the initial line and trace out an ∠XOP = θ. Let Q be a point on OP. Draw QM⊥OX.

Right angled triangle for the Trigonometric ratios of 90°

When θ is increased and tends to be 90° keeping MQ constant, then OM = 0 and OQ = MQ.

Now, from right angled triangle MOQ with angle of reference θ = 90°,

Trigonometric ratios of 90°: sin90° = "MQ" /"OQ" = "MQ" /"MQ" = 1 cosec90° = "OQ" /"MQ" = "MQ" /"MQ" = 1 cos90° = "OM" /"OQ" = "0" /"OQ" = 0 sec90° = "OQ" /"OM" = "OQ" /"0" = ∞ (undefined) tan90° = "MQ" /"OM" = "MQ" /"0" = ∞ (undefined) cot90° = "OM" /"MQ" = "0" /"MQ" = 0

Table of Trigonometric Ratios of Standard Angles

Table of Trigonometric Ratios of Standard Angles

Worked Out Examples

Example 1: Find the value of sin²30° + sin²45° + sin²60°

Solution: Here,

sin230° + sin245° + sin260° = ("1" /"2" )^"2" + ("1" /√("2" ))^"2" + (√("3" )/"2" )^"2" = "1" /"4" + "1" /"2" + "3" /"4" = "1 + 2 + 3" /"4" = "6" /"4" = "3" /"2" Ans.

Example 2: Find the value of:

Find the value of tan〖"π" /"3" 〗^"c" sin〖"π" /"3" 〗^"c" + sin〖"π" /"4" 〗^"c" cos〖"π" /"2" 〗^"c" + cos〖"π" /"2" 〗^"c" sin〖"π" /"3" 〗^"c"

Solution: Here,

tan〖"π" /"3" 〗^"c" sin〖"π" /"3" 〗^"c" + sin〖"π" /"4" 〗^"c" cos〖"π" /"2" 〗^"c" + cos〖"π" /"2" 〗^"c" sin〖"π" /"3" 〗^"c" = tan60°sin60° + sin45°cos90° + cos90°sin60° = √("3" ) × √("3" )/"2" + "1" /√("2" ) × 0 + 0 × √("3" )/"2" = "3" /"2" + 0 + 0 = "3" /"2" Ans.

Example 3: Prove that:

Prove that: ("1 " +" tan30°" )/("1 " -" tan30°" ) = ("cos30° " +" sin30°" )/("cos30° " -" sin30°" )

Solution: Here,

LHS = ("1 " +" tan30°" )/("1 " -" tan30°" ) = (" 1 " +" " "1" /√("3 " ))/("1 " -" " "1" /√("3" )) = ((√("3" ) " " +" 1" )/√("3" ))/((√("3" ) -" 1" )/√("3" )) = (√("3" ) " " +" 1" )/(√("3" ) -" 1" ) RHS = ("cos30° " +" sin30°" )/("cos30° " -" sin30°" ) = ( √("3" )/"2" " " +" " "1" /"2 " )/(√("3" )/"2" " " -" " "1" /"2" ) = ((√("3" ) " " +" 1" )/√("3" ))/((√("3" ) -" 1" )/√("3" )) = (√("3" ) " " +" 1" )/(√("3 " )-" 1" ) ∴ LHS = RHS. Proved.

Example 4: Find the value of x: sin60°cos30° + x sin45°cos45° = sin30°cos60°

Solution: Here,

sin60°cos30° + x sin45°cos45° = sin30°cos60° or, √("3" )/"2" × √("3" )/"2" + x "1" /√("2" ) × "1" /√("2" ) = "1" /"2" × "1" /"2" or, "3" /"4" + "x" /"2" = "1" /"4" or, "x" /"2" = "1" /"4" – "3" /"4" or, "x" /"2" = ("1 " -" 3" )/"4" or, "x" /"2" = (-" 2" )/"4" or, "x" /"2" = (-" 1" )/"2" or, 2x = – 2 or, x = – 1 Ans.

Example 5: In the given figure, the distance between house B and House C is 20m and ∠BCA = 30°. Calculate the distance between house A and B.

Solution: Here,

ΔABC is a right angled triangle. BC = 20m, ∠BCA = 30° and ∠BAC = 90°

Example 5: Right angled triangle

Sin30° = AB/BC

or, ½ = AB/20m

or, 2AB = 20m

or, AB = 20m/2

or, AB = 10m

Hence, the distance between house A and B is 10m.

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