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.

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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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About author: Min Rajbanshi

I am a school math teacher and a blogger since 2012. I do blogging on a variety of topics including math. Over the years, I've explored and written about a wide range of topics, with a particular emphasis on mathematics. My passion for education extends beyond the classroom, as I enjoy sharing knowledge and insights on various subjects through my blog.

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