Algebraic Expressions Formulas For Class 11th
The term algebra is made up of alphabets and numbers. Numbers are always fixed, i.e their values are always known. Alphabets in algebra are used to denote the unknown quantities in the algebra formula. A combination of numbers, alphabets, factorials, matrices are used to form an algebraic equation or formula. This is significantly the methodology for algebra.
There are certain algebraic formulas that are important for the students to learn as it will help them to solve different algebraic equations. Only learning the algebraic formulas is not enough. The students must also understand the concepts behind the formula and learn to use them wisely.
In this article, we will provide a list of all the important algebraic formulas for class 11. The comprehensive list of algebraic formulas for class 11 will help the students to have a quick glance before the exams. Remember, only learning the formulas is not sufficient. You must also know how to use this formula to solve a given problem.
[Image will be uploaded soon]
List of Algebra Formulas For Class 11th
All the important algebraic expressions formulas for class 11th given below enable the students to easily search and learn them as it is listed by Vedantu in one single page. This list of algebraic expressions formulas for class 11th will help students not to miss any formula while studying for competitive or board exams.
We believe Algebra Formulas for class 11 enable the students to learn them and enhance confidence in solving algebraic problems. The list of all algebraic expressions formulas for class 11th are given below.
(x + θ)² = x² + θ² + 2xθ
(x - θ)² = x² + θ² - 2xθ
(x + θ)³ = x³ + θ³ + 3xθ(x + θ)
(x - θ)³ = x³ + θ³ - 3xθ(x - θ)
(x)² - (θ)² = ( x + θ)(x - θ)
(x)³ - (θ)³ = (x - θ)(x² + xθ + θ²)
(x)³ + (θ)³ = (x + θ)(x² - xθ + θ²)
(x)⁴ - (θ)⁴ = (x - θ) (x+ θ)(x² + θ²)
(x)⁵ - (θ)⁵ = (x - θ) (x⁴ + x³θ + x²θ² + xθ³ +θ⁴)
(x)⁵ + (θ)⁵ = (x + θ) (x⁴ - x³θ + x²θ² - xθ³ +θ⁴)
( x + y + θ)² = x² + y² + θ² + 2xy +2yθ +2xθ
( x - y -θ)² = x² + y² + θ² - 2xy + 2yθ - 2xθ
x³ + y³ + θ³ - 3xθ = ( x + y +θ)( x² + y² + θ² - xy - yθ - xθ)
(xm)( xn)= xm+n
(xy)m = xmym
(xm)n = xmn
If n is even, then
xn - yn = (x - y) (xn-1 + xn-2 + x n-3 y ² + …..+ x y n-2 + yn-1
If n is odd, then
xn + yn = (x + y) (xn-1 - xn-2 + x n-3 y ² - …..- xy n-2 + yn-1
Binomial Theorem Class 11 Formulas
The expansion of the binomial theorem for any positive integer n is derived by binomial theorem. The formulas of binomial theorem class 11 are used for expressing the powers of sums. The binomial theorem equation is given as
(x + ϴ) n = nC0 an + nC1 an-1 ϴ + nC2 an-2 ϴ2 +…..+ nCn-1 x ϴn-1 + nCn ϴn
After simplifying the above equation,we get the following formulas of binomial theorem class 11
The general term of an expression (x + ϴ) n is Tr + 1 = nCran-r ϴ r
The general term of an expression (x - ϴ) n = (-1)r = nCran-r ϴ r
The general term of an expression (1 + ϴ) n = nCr xr
The general term of an expression (1 - ϴ) n =(-1)r = nCr xr
In the expansion (x + ϴ) n , if n is even, then the middle term will be (n/2 + 1)th term. If n is odd, then the middle terms are (n/2 + 1)th and (n + 1/2 + 1) th term.
rth term from the end in (x + ϴ) n is equals to ( n + 2 – r) th term from the beginning.
Solved Examples
1. Expand (3p - 4q)³ by using the standard algebraic identities.
Solution:
(3p - 4q)³ is an algebraic identity where a = 3p and b = 4q. Accordingly, we have
(3p - 4q)³ = (3p)³ - (4q)³ -3 (3p)(4q)(3p - 4q)
= 27p³ - 64q³ -108p²q + 11pq².
2. Factorize (p⁴ - 1) using the standard algebraic identities.
Solution: (p⁴ - 1) is an algebraic identity where a = p² and b = 1.
Accordingly, we have
(p⁴ - 1) = ((p²)². -1².) = (p² + 1)(p² - 1)
The factor (p² + 1) can be factored further using the similar identity where a = p and b = 1.
Accordingly,
(p⁴ - 1) = (p² + 1)((p)² -1²) = (p² + 1)(p - 1).
3. The total of the real values of y for which the middle term in the binomial expansion of (y³/y) + (3/y)⁸ equal to 5760 is?
Solution:
T5 = 8C4 × (y12/ 81) × (81/ y4) = 5670
⇒ 70y⁸ = 5670
⇒ y = ± √3
3. Find the coefficient of y9 in the expansion of ( 1+ y) (1+ y²) (1+ y³)...(1 + y100).
Solution:
y9 can be expressed in 8 ways.
i.e. y9, y1+8 , y2+7 , y3+6 , y4+5 , y1+3 + 5, y2+3 + 4
Hence, the coefficient of y9 = 1 + 1+ 1 +……+ 8 times= 8
Quiz Time.
Find the Binomial coefficient of the 5th term of the expansion (x + y)⁸
52
70
58
2. (xp² - θ²) is a product of
(x² + θ²) (x² - θ²)
(x² + θ²) (x² + θ²)
(x² - θ²) (x² - θ²)
None of these
FAQs on Algebra Formulas For Class 11th
1. Which foundational algebraic identities are essential for Class 11 Maths?
Several key identities from previous classes remain crucial for solving complex problems in Class 11. Students must be proficient with the following:
- (a + b)² = a² + 2ab + b²
- (a - b)² = a² - 2ab + b²
- (a + b)(a - b) = a² - b²
- (a + b)³ = a³ + b³ + 3ab(a + b)
- (a - b)³ = a³ - b³ - 3ab(a - b)
- a³ + b³ = (a + b)(a² - ab + b²)
- a³ - b³ = (a - b)(a² + ab + b²)
Mastering these is the first step before tackling more advanced Class 11 concepts as per the 2025-26 CBSE syllabus.
2. What are the most important new algebraic formulas introduced in the Class 11 syllabus?
Class 11 introduces several new sets of formulas that are critical for higher-level mathematics. Key areas include:
- Complex Numbers: Formulas for modulus, argument, and the conjugate of a complex number (e.g., |z|, arg(z)).
- Permutations and Combinations: The formulas for arranging and selecting items, ⁿPᵣ = n! / (n-r)! and ⁿCᵣ = n! / [r!(n-r)!].
- Binomial Theorem: The expansion of (a + b)ⁿ and the formula for finding any specific term, Tᵣ₊₁ = ⁿCᵣ aⁿ⁻ʳ bʳ.
- Sequences and Series: Formulas for the nth term (aₙ) and the sum of n terms (Sₙ) for both Arithmetic Progressions (AP) and Geometric Progressions (GP).
3. How does algebra in Class 11 differ from what is taught in Class 10?
The main difference is the increased level of abstraction and application. While Class 10 algebra primarily focuses on polynomials and solving quadratic equations, Class 11 algebra introduces more abstract topics that require deeper logical reasoning. These include complex numbers, the principle of mathematical induction, and combinatorial algebra (permutations and combinations). The focus shifts from direct calculation to applying the right formulas in complex, multi-step problems.
4. What is the Binomial Theorem, and why is it so important in algebra?
The Binomial Theorem provides a general algebraic formula for the expansion of any power of a binomial expression, such as (x + y)ⁿ, for a positive integer n. Its importance goes beyond simple algebraic expansion; it is a fundamental tool in advanced mathematics, including probability theory, statistics, and calculus. For example, it is used to find probabilities in binomial distributions and to derive important results in other mathematical fields.
5. What is the practical difference between using the permutation (ⁿPᵣ) and combination (ⁿCᵣ) formulas?
The key difference lies entirely in the importance of order. You must choose the correct formula based on the problem's context:
- Use the Permutation (ⁿPᵣ) formula when the order of arrangement or selection matters. For example, determining the 1st, 2nd, and 3rd place winners in a race is a permutation.
- Use the Combination (ⁿCᵣ) formula when the order of selection does not matter. For example, choosing a committee of 3 members from a group of 10 is a combination, as the group {A, B, C} is the same as {B, C, A}.
6. How are algebraic formulas applied to solve problems? Can you provide a simple Class 11 example?
Certainly. Let's use the combination formula to solve a common problem.
Problem: In how many ways can a cricket team of 11 players be selected from a squad of 15 players?
Solution: Since the order in which players are selected does not matter for the final team, we use the combination formula ⁿCᵣ = n! / [r!(n-r)!].
- Here, n (total players) = 15
- And r (players to be selected) = 11
So, ¹⁵C₁₁ = 15! / [11!(15-11)!] = 15! / (11! * 4!) = (15 × 14 × 13 × 12) / (4 × 3 × 2 × 1) = 1365.
Therefore, there are 1,365 different ways to select the team.
7. Where are formulas for complex numbers, such as z = a + ib, used in real-world applications?
Although they seem abstract, formulas involving complex numbers are extremely practical in many advanced fields. In electrical engineering, they are essential for analysing alternating current (AC) circuits, making calculations much simpler. They are also fundamental in physics for describing quantum mechanics, in signal processing for analysing sound waves, and in computer graphics for generating complex patterns like fractals.
