Access free live classes and tests on the app
Download
+
Unacademy's Blog!
Login Join for Free
avtar
  • ProfileProfile
  • Settings Settings
  • Refer your friendsRefer your friends
  • Sign outSign out
  • Terms & conditions
  • •
  • Privacy policy
  • About
  • •
  • Careers
  • •
  • Blog

© 2023 Sorting Hat Technologies Pvt Ltd

[wp_login_wall media_id="448945" text_before_login="Download JEE Maths Formulas" text_after_login="Download JEE Maths Formulas"]

Trending Topics

  • JEE Main 2024
  • JEE Main Rank Predictor 2024
  • JEE Main Mock Test 2024
  • JEE Main 2024 Admit Card
  • JEE Advanced Syllabus
  • JEE Preparation Books
  • JEE Notes
  • JEE Advanced Toppers
  • JEE Advanced 2022 Question Paper
  • JEE Advanced 2022 Answer Key
  • JEE Main Question Paper
  • JEE Main Answer key 2022
  • JEE Main Paper Analysis 2022
  • JEE Main Result
  • JEE Exam Pattern
  • JEE Main Eligibility
  • JEE College predictor
[wp_login_wall media_id="424566" text_before_login=" Download Previous Year Papers" text_after_login="Download Previous Year Papers"] combat_iitjee

Related links

  • JEE Study Materials
  • CNG Full Form
  • Dimensional Formula of Pressure
  • Reimer Tiemann Reaction
  • Vector Triple Product
  • Swarts Reaction
  • Focal length of Convex Lens
  • Root mean square velocities
  • Fehling’s solution
testseries_iitjee Predict your JEE Rank .
[wp_login_wall media_id="448945" text_before_login="Download JEE Maths Formulas" text_after_login="Download JEE Maths Formulas"]

Trending Topics

  • JEE Main 2024
  • JEE Main Rank Predictor 2024
  • JEE Main Mock Test 2024
  • JEE Main 2024 Admit Card
  • JEE Advanced Syllabus
  • JEE Preparation Books
  • JEE Notes
  • JEE Advanced Toppers
  • JEE Advanced 2022 Question Paper
  • JEE Advanced 2022 Answer Key
  • JEE Main Question Paper
  • JEE Main Answer key 2022
  • JEE Main Paper Analysis 2022
  • JEE Main Result
  • JEE Exam Pattern
  • JEE Main Eligibility
  • JEE College predictor
[wp_login_wall media_id="424566" text_before_login=" Download Previous Year Papers" text_after_login="Download Previous Year Papers"] combat_iitjee

Related links

  • JEE Study Materials
  • CNG Full Form
  • Dimensional Formula of Pressure
  • Reimer Tiemann Reaction
  • Vector Triple Product
  • Swarts Reaction
  • Focal length of Convex Lens
  • Root mean square velocities
  • Fehling’s solution
testseries_iitjee Predict your JEE Rank .
JEE Main 2026 Preparation: Question Papers, Solutions, Mock Tests & Strategy Unacademy » JEE Study Material » Mathematics » Problems with De Moivre’s identity
[wp_login_wall media_id="448945" text_before_login="Download JEE Maths Formulas" text_after_login="Download JEE Maths Formulas"]

Trending Topics

  • JEE Main 2024
  • JEE Main Rank Predictor 2024
  • JEE Main Mock Test 2024
  • JEE Main 2024 Admit Card
  • JEE Advanced Syllabus
  • JEE Preparation Books
  • JEE Notes
  • JEE Advanced Toppers
  • JEE Advanced 2022 Question Paper
  • JEE Advanced 2022 Answer Key
  • JEE Main Question Paper
  • JEE Main Answer key 2022
  • JEE Main Paper Analysis 2022
  • JEE Main Result
  • JEE Exam Pattern
  • JEE Main Eligibility
  • JEE College predictor
[wp_login_wall media_id="424566" text_before_login=" Download Previous Year Papers" text_after_login="Download Previous Year Papers"] combat_iitjee

Related links

  • JEE Study Materials
  • CNG Full Form
  • Dimensional Formula of Pressure
  • Reimer Tiemann Reaction
  • Vector Triple Product
  • Swarts Reaction
  • Focal length of Convex Lens
  • Root mean square velocities
  • Fehling’s solution
testseries_iitjee Predict your JEE Rank .

Problems with De Moivre’s identity

This article contains details on De Moivre’s identity. It also focuses on De Moivre’s HOTS questions and includes a brief introduction to what exactly this identity means.

Table of Content
  •  

DeMoivre’s theorem is one of the most significant and helpful theories which interrelates complex numbers and Trigonometry. Evaluating the power of a complex number becomes a hectic task if we keep increasing the power of the complex number, so we have developed a theorem to deal with these types of problems.

We generally use this theorem to evaluate the power of complex numbers in polar form. We can transform any complex number into its polar form and then evaluate the power of the complex number as required. This makes the evaluation power of a complex number significantly easier than multiplying it several times.

Theory 

In this article, we will learn about De Moivre’s identity, its meaning, and the High Order Thinking Skills (HOTS) Question.

DeMoivre’s Identity 

For DeMoivre’s Identity, we first must have a basic knowledge of complex number in its polar formula.

We can represent a complex number using trigonometry, much like we represent vectors in trigonometric form. We also call this representation the ‘polar form’ of complex numbers. Rather than using a coordinate for the real and imaginary parts, we use the absolute value of the complex number and the directed angle from the positive x-axis or polar axis to the line segment connecting the complex point to the pole, measured in a counter-clockwise direction.

So, if a complex number ‘z’ is represented as z = a+ib

Then to represent it in polar form we have

a = rcosθ and b = rsinθ

r = √(a²+b²) and θ = tan-1(b/a).

So, the polar formula of z = r(cosθ + i(sinθ))

cir

De Moivre’s identity: If z = rcosθ+isinθ

Now, if we want to compute zn, where n is any rational number, then we have-

Zn = (rcosθ + isinθ)n

So, according to DeMoivre’s identity, we have 

Zn = rn(cosnθ + isin(nθ))

DeMoivre’s HOTS Questions

Now, we can use DeMoivre’s identity in various forms and develop our high-order thinking skills so we can use this identity on an advanced level.

We will concentrate on various forms of this theorem by trigonometric correlation and trigonometric formulas/relations.

For example:

  1. (cosθ + isinθ)-n =cos(-nθ) + isin(-nθ)

=cosnθ – isin(nθ)

  1. (cosθ – isinθ)n =cosnθ – isin(nθ)
  2. (cosθ – isinθ)-n =cos(nθ) + isin(nθ)

Note: cos(-θ) =cosθ

sin(-θ)=sinθ

Now, we can also represent an equation in polar form into its Euler form which is given by :

eiθ =  cosθ + isinθ

e-iθ = cos(-θ) + isin(-θ)

e-iθ =  cosθ – isinθ

Now we have-

eiθ + e-iθ = cosθ + isinθ + cosθ – isinθ = 2cosθ

eiθ – e-iθ = cosθ + isinθ – cosθ + isinθ = 2isinθ

These two equations are very important in solving higher-level questions (HOTS) based on this topic.

If eia = cosa + isina and eib = cosb + isinb

Then eia * eib = e(ia+ib) = ei(a+b)

which will give us ei(a + b) = cos(a +b) + isin(a +b).

So we have: (cosa + isina).(cosb + isinb) = cos(a + b) + isin(a + b) ………… (I)

This equation is used to simplify many HOTS when the multiplication of complex numbers is involved.

  • Problem (HOTS) based on DeMoivre’s Theorem

Here, we will focus on different types of problem sets that are developed on DeMoivre’s Theorem.

A- Proof z = (√3/2 + i/2)5 + (√3/2 – i/2)5 = 2cos(150°)

Here, we have to put √3/2 = rcosθ and 1/2 = rsinθ

Now, we have (rcosθ)2 + (rsinθ)2 = 3/4 + 1/4 = 1.

so  r2(cos2θ + sin2θ) = 1 

hence, r2 = 1 ⇒ r =1

Now rsinθ = 1/2 ⇒ sinθ = 1/2

⇒ θ = 30°

Now z = (cosθ + isinθ)5 + (cosθ – isinθ)5

= cos5θ + isin5θ + cos5θ – isin5θ

=2cos5θ ⇒ 2cos150°           

B- If cos α + cosβ + cosγ  = sinα +sinβ +sinγ = 0 then prove that:

cos3α + cos3β +cos3γ = 3cos(α+β+γ)

Now, we take sinα + sinβ + sinγ = 0, multiply both sides with i and then add it to cosα + cosβ + cosγ

So we have i(sinα + sinβ +sinγ) + (cosα + cosβ + cosγ) = 0

= cosα + isinα +cosβ + isinβ + cosγ + isinγ = 0

Now let z1 = cosα + isinα

z2 = cosβ + isinβ

z3 = cosγ + isinγ

and we have z1 +z2 +z3 = 0

Through algebra, we know that z13 + z23 + z33 – 3z1.z2.z3 = (z1 + z2 + z3).(z12 + z22 + z32 – z1z2 – z2z3 – z3z1)

so z13 + z23 + z33 = 3z1z2z3

Now, we have (cosα + isinα) 3 + (cosβ + isinβ)3 + (cosγ + isinγ)3

= 3(cosα + isinα)(cosβ + isinβ)(cosγ + isinγ)

⇒ (cos3α + isin3α) + (cos3β + isin3β) + (cos3γ + isinγ3γ)

= 3[cos(α+β +γ) + isin(α+β +γ)]  from (i)         {see theory part}

Now, equate real part to real part, then we have

cos3α + cos3β + cos3γ = 3cos(α+β +γ)

Conclusion

Evaluation of problems based on the power of complex numbers can become hectic if we start multiplying the complex number by itself for n number of times. In this type of situation, DeMoivre’s Identity states that if Zn = (rcosθ + isinθ)n, then

Zn = rn(cosnθ + isinn(θ)) is useful.

DeMoivre’s Identity is applied in the polar form of a complex number and can help us interrelate complex numbers and trigonometric functions. It can be further used by converting the polar form of complex numbers into its Euler form, which can further simplify the problems (HOTS) based on this identity.

faq

Frequently Asked Questions

Get answers to the most common queries related to the JEE Examination Preparation.

Prove that (cos60° + isin60°)6 = 1

Ans : (cos60° + isin60° )6 = co...Read full

Compute (cos2θ - isin2θ)7.(cos3θ + isin3θ)-5/(cos4θ + isin4θ)12

Ans. = (cos14θ – isin14θ).(cos(-15θ) + isin(-15θ))/(cos48θ + isin4...Read full

Compute [(cosθ + isinθ).(cosθ - isinθ)]-1

Ans.  = (cos(-θ) + isin(-θ)).(cos(-θ) – isin(-θ)) ...Read full

(cos2θ + isin2θ)-5.(cos3θ - isin3θ)6.(sinθ - icosθ)3

Ans. Firstly sinθ – icosθ can be written as -i2...Read full

Ans : (cos60° + isin60° )6

= cos (6*60°) + isin(6*60°)

   = cos (360°) + isin(360°)

    = 1+ i0 =1 

Ans. = (cos14θ – isin14θ).(cos(-15θ) + isin(-15θ))/(cos48θ + isin48θ)

Now from euler’s form we have

= e-14iθ.e-15iθ / e48iθ

= e-77iθ

= cos77θ – isin77θ

Ans.  = (cos(-θ) + isin(-θ)).(cos(-θ) – isin(-θ))

 = (cosθ – isinθ).(cosθ + isinθ)

 = cos2 θ – i2sin2 θ 

 = cos2 θ + sin2 θ

 = 1

Ans. Firstly sinθ – icosθ can be written as -i2sinθ – cosθ = -i(cosθ + isinθ)

= (cos(-10θ) + isin(-10θ)).(cos18θ – isin18θ).(-i)3(cos3θ + isin3θ) 

(here cos18θ = cos(-18θ))

Now from (I) (see theory) we have 

i*(Cos(-10θ -18θ+ 3θ) + isin(-10θ -18θ -+3θ))

= i( cos(-25θ) + isin(-25θ)) 

= i(cos25θ – isin25θ)

Trending Topics

  • JEE Main 2024
  • JEE Main Rank Predictor 2024
  • JEE Main Mock Test 2024
  • JEE Main 2024 Admit Card
  • JEE Advanced Syllabus
  • JEE Preparation Books
  • JEE Notes
  • JEE Advanced Toppers
  • JEE Advanced 2022 Question Paper
  • JEE Advanced 2022 Answer Key
  • JEE Main Question Paper
  • JEE Main Answer key 2022
  • JEE Main Paper Analysis 2022
  • JEE Main Result
  • JEE Exam Pattern
  • JEE Main Eligibility
  • JEE College predictor
combat_iitjee

Related links

  • JEE Study Materials
  • CNG Full Form
  • Dimensional Formula of Pressure
  • Reimer Tiemann Reaction
  • Vector Triple Product
  • Swarts Reaction
  • Focal length of Convex Lens
  • Root mean square velocities
  • Fehling’s solution
testseries_iitjee
Predict your JEE Rank
.

Trending Topics

  • JEE Main 2024
  • JEE Main Rank Predictor 2024
  • JEE Main Mock Test 2024
  • JEE Main 2024 Admit Card
  • JEE Advanced Syllabus
  • JEE Preparation Books
  • JEE Notes
  • JEE Advanced Toppers
  • JEE Advanced 2022 Question Paper
  • JEE Advanced 2022 Answer Key
  • JEE Main Question Paper
  • JEE Main Answer key 2022
  • JEE Main Paper Analysis 2022
  • JEE Main Result
  • JEE Exam Pattern
  • JEE Main Eligibility
  • JEE College predictor
combat_iitjee

Related links

  • JEE Study Materials
  • CNG Full Form
  • Dimensional Formula of Pressure
  • Reimer Tiemann Reaction
  • Vector Triple Product
  • Swarts Reaction
  • Focal length of Convex Lens
  • Root mean square velocities
  • Fehling’s solution
testseries_iitjee
Predict your JEE Rank
.
Company Logo

Unacademy is India’s largest online learning platform. Download our apps to start learning


Starting your preparation?

Call us and we will answer all your questions about learning on Unacademy

Call +91 8585858585

Company
About usShikshodayaCareers
we're hiring
BlogsPrivacy PolicyTerms and Conditions
Help & support
User GuidelinesSite MapRefund PolicyTakedown PolicyGrievance Redressal
Products
Learner appLearner appEducator appEducator appParent appParent app
Popular goals
IIT JEEUPSCSSCCSIR UGC NETNEET UG
Trending exams
GATECATCANTA UGC NETBank Exams
Study material
UPSC Study MaterialNEET UG Study MaterialCA Foundation Study MaterialJEE Study MaterialSSC Study Material

© 2026 Sorting Hat Technologies Pvt Ltd

Unacademy's Blog!

Share via

COPY