100 Practice Questions with Solutions – Algebra Basics to Advanced

Algebra Practice Questions
with Detailed Solutions
(100 Questions – From Basic to Advanced)

Basic (30) Algebra Questions and
Solutions

Section 1: Simplification & Basic Operations
Q1. Simplify:
(3x+5)+(2x−7)(3x + 5) + (2x - 7)(3x+5)+(2x−7)

Solution:
Combine like terms:

3x+2x+5−7=5x−23x + 2x + 5 - 7 = 5x -
23x+2x+5−7=5x−2

Answer: 5x - 2



Q2. Simplify:
(4a−6)−(2a+3)(4a - 6) - (2a + 3)(4a−6)−(2a+3)

Solution:
Distribute the minus:

4a−6−2a−3=(4a−2a)+(−6−3)=2a−94a - 6 - 2a - 3 = (4a
- 2a) + (-6 - 3) = 2a - 94a−6−2a−3=(4a−2a)+
(−6−3)=2a−9

Answer: 2a - 9



Q3. Simplify:
(5x)(2x+3)(5x)(2x + 3)(5x)(2x+3)

,Solution:
Multiply each term:

5x⋅2x+5x⋅3=10x2+15x5x \cdot 2x + 5x \cdot 3 = 10x^2
+ 15x5x⋅2x+5x⋅3=10x2+15x

Answer: 10x² + 15x


Q4. Simplify:
(x+4)(x−2)(x + 4)(x - 2)(x+4)(x−2)

Solution:
Use distributive property (FOIL):

x2−2x+4x−8=x2+2x−8x^2 - 2x + 4x - 8 = x^2 + 2x -
8x2−2x+4x−8=x2+2x−8

Answer: x² + 2x - 8



Q5. Expand and simplify:
(2x+3)2(2x + 3)^2(2x+3)2

Solution:
Square formula: (a+b)2=a2+2ab+b2(a+b)^2 = a^2 + 2ab +
b^2(a+b)2=a2+2ab+b2

(2x)2+2(2x)(3)+(3)2=4x2+12x+9(2x)^2 + 2(2x)(3) +
(3)^2 = 4x^2 + 12x + 9(2x)2+2(2x)(3)+(3)2=4x2+12x+9

Answer: 4x² + 12x + 9



Section 2: Solving Linear Equations
Q6. Solve for xxx:

2x+5=152x + 5 = 152x+5=15

Solution:
Subtract 5:

, 2x=102x = 102x=10

Divide by 2:

x=5x = 5x=5

Answer: x = 5



Q7. Solve:

3x−7=113x - 7 = 113x−7=11

Solution:
Add 7:

3x=183x = 183x=18

Divide by 3:

x=6x = 6x=6

Answer: x = 6



Q8. Solve:

5x+2=3x+105x + 2 = 3x + 105x+2=3x+10

Solution:
Bring terms together:

5x−3x=10−25x - 3x = 10 - 25x−3x=10−2 2x=8 ⟹
x=42x = 8 \implies x = 42x=8⟹x=4

Answer: x = 4



Q9. Solve:

4(x−2)=124(x - 2) = 124(x−2)=12