Class 8 RD Sharma Solutions Chapter 8 Division Of Algebraic Expressions Exercise 8.3 (original) (raw)
Last Updated : 12 Sep, 2024
Exercise 8.3 in Chapter 8 of RD Sharma's Class 8 mathematics textbook focuses on the division of algebraic expressions. This exercise builds upon previous concepts of algebraic operations and introduces students to more complex division problems involving polynomials and algebraic fractions. Students will learn to simplify expressions, identify common factors, and apply the rules of exponents in division.
**Question 1. Divide x + 2x 2 + 3x 4 – x 5 by 2x
**Solution:
Here,
(x + 2x2 + 3x4 – x5) / 2x
x/2x + 2x2/2x + 3x4/2x – x5/2x
By using this formula ⇒ an/am = an-m
1/2 x1-1 + x2-1 + 3/2 x4-1 – 1/2 x5-1
1/2 + x + 3/2 x3 – 1/2 x4
**Question 2. Divide y 4 – 3y 3 + 1/2y 2 by 3y
**Solution:
Here,
(y4 – 3y3 + 1/2y2)/ 3y
y4/3y – 3y3/3y + (½)y2/3y
By using this formula ⇒ an/am = an-m
1/3 y4-1 – y3-1 + 1/6 y2-1
1/3y3 – y2 + 1/6y
**Question 3. Divide -4a 3 + 4a 2 + a by 2a
**Solution:
Here,
(-4a3 + 4a2 + a) / 2a
-4a3/2a + 4a2/2a + a/2a
By using this formula ⇒ an/am = an-m
-2a3-1 + 2a2-1 + 1/2 a1-1
-2a2 + 2a + 1/2
**Question 4. Divide –x 6 + 2x 4 + 4x 3 + 2x 2 by √2x 2
**Solution:
Here,
(–x6 + 2x4 + 4x3 + 2x2) / √2x2
-x6/√2x2 + 2x4/√2x2 + 4x3/√2x2 + 2x2/√2x2
By using this formula ⇒ an/am = an-m
-1/√2 x6-2 + 2/√2 x4-2 + 4/√2 x3-2 + 2/√2 x2-2
-1/√2 x4 + √2x2 + 2√2x + √2
**Question 5. Divide -4a 3 + 4a 2 + a by 2a
**Solution:
Here,
(-4a3 + 4a2 + a) / 2a
-4a3/2a + 4a2/2a + a/2a
By using this formula ⇒ an/am = an-m
-2a3-1 + 2a2-1 + 1/2a1-1
-2a2 + 2a + 1/2
**Question 6. Divide √3a 4 + 2√3a 3 + 3a 2 – 6a by 3a
**Solution:
Here,
(√3a4 + 2√3a3 + 3a2 – 6a) / 3a
√3a4/3a + 2√3a3/3a + 3a2/3a – 6a/3a
By using this formula ⇒ an/am = an-m
√3/3 a4-1 + 2√3/3 a3-1 + a2-1 – 2a1-1
1/√3 a3 + 2/√3 a2 + a – 2
Summary
Exercise 8.3 reinforces students' understanding of algebraic division, emphasizing the importance of identifying common factors, applying exponent rules, and simplifying expressions. By practicing these problems, students develop crucial skills in manipulating algebraic expressions, which forms a foundation for more advanced mathematical concepts in higher grades.