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Chapters
2: Estimation
3: Numbers in India and International System (With Comparison)
4: Place Value
5: Natural Numbers and Whole Numbers (Including Patterns)
6: Negative Numbers and Integers
7: Number Line
8: HCF and LCM
9: Playing with Numbers
10: Sets
11: Ratio
12: Proportion (Including Word Problems)
13: Unitary Method
14: Fractions
15: Decimal Fractions
16: Percent (Percentage)
17: Idea of Speed, Distance and Time
18: Fundamental Concepts of algebra
▶ 19: Fundamental Operations (Related to Algebraic Expressions)
20: Substitution (Including Use of Brackets as Grouping Symbols)
21: Framing Algebraic Expressions (Including Evaluation)
22: Simple (Linear) Equations (Including Word Problems)
23: Fundamental Concepts geometry
24: Angles (With their Types)
25: Properties of Angles and Lines (Including Parallel Lines)
26: Triangles (Including Types, Properties and Constructions)
27: Quadrilateral
28: Polygons
29: The Circle
30: Revision Exercise Symmetry (Including Constructions on Symmetry)
31: Recognition of Solids
32: Perimeter and Area of Plane Figures
33: Data Handling (Including Pictograph and Bar Graph)
34: Mean and Median
![Selina solutions for Mathematics [English] Class 6 chapter 19 - Fundamental Operations (Related to Algebraic Expressions) - Shaalaa.com](/images/mathematics-english-class-6_6:44f3c4f6e33345f4bf41a86d406bf37f.jpg "Selina solutions for Mathematics [English] Class 6 chapter 19 - Fundamental Operations (Related to Algebraic Expressions)")
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Solutions for Chapter 19: Fundamental Operations (Related to Algebraic Expressions)
Below listed, you can find solutions for Chapter 19 of CISCE Selina for Mathematics [English] Class 6.
Selina solutions for Mathematics [English] Class 6 19 Fundamental Operations (Related to Algebraic Expressions) Exercise 19 (A)
Fill in the blanks:
5 + 4 = ………… and 5x + 4x = ………….
Fill in the blanks:
12 + 18 = ………… and 12x2y + 18x2y = …………
Fill in the blanks:
7 + 16 = ………….. and 7a + 16b = …………
Fill in the blanks:
1 + 3 = ………… and x2y + 3xy2 = ………..
Fill in the blanks:
7 – 4 = …………… and 7ab – 4ab = …………..
Fill in the blanks:
12 – 5 = ………… and 12x – 5y = ……………
Fill in the blanks:
35 – 16 = ………….. and 35ab – 16ba = ………….
Fill in the blanks:
28 – 13 = …………. and 28ax2 – 13a2x = ………….
Fill in the blanks:
The sum of – 2 and – 5 = …………. and the sum of – 2x and – 5x = …………….
Fill in the blanks:
The sum of 8 and – 3 = ………….. and the sum of 8ab and – 3ab = ………….
Fill in the blanks:
The sum of – 15 and – 4 = …………….. and the sum of – 15x and − 4y = ………………
Fill in the blanks:
15 + 8 + 3 = ……….. and 15x + 8y + 3x = …………….
Fill in the blanks:
12 – 9 + 15 = …………… and 12ab – 9ab + 15ba = ……………..
Fill in the blanks:
25 – 7 – 9 = ............... and 25xy – 7xy – 9yx = ……………
Fill in the blanks:
– 4 – 6 – 5 = …………. and – 4ax – 6ax – 5ay = …………….
Add:
8xy and 3xy
Add:
2xyz, xyz and 6xyz
Add:
2a, 3a and 4b
Add:
3x and 2y
Add:
5m, 3n and 4p
Add:
6a, 3a and 9ab
Add:
3p, 4q and 9q
Add:
5ab, 4ba and 6b
Add:
50pq, 30pq and 10pr
Add:
– 2y, – y and – 3y
Add:
– 3b and – b
Add:
5b, – 4b and – 10b
Add:
– 2c, – c and – 5c
Evaluate:
6a − a − 5a − 2a
Evaluate:
2b − 3b − b + 4b
Evaluate:
3x − 2x − 4x + 7x
Evaluate:
5ab + 2ab − 6ab + ab
Evaluate:
8x − 5y − 3x + 10y
Evaluate:
− 7x + 9x + 2x − 2x
Evaluate:
5ab − 2ab − 8ab + 6ab
Evaluate:
− 8a − 3a + 12a + 13a − 6a
Evaluate:
19abc − 11abc − 12abc + 14abc
Subtract the first term from the second:
4ab, 6ba
Subtract the first term from the second:
4.8b, 6.8b
Subtract the first term from the second:
3.5abc, 10.5abc
Subtract the first term from the second:
`3 1/2"mn",8 1/2"nm"`
Simplify:
2a2b2 + 5ab2 + 8a2b2 − 3ab2
Simplify:
4a + 3b − 2a − b
Simplify:
2xy + 4yz + 5xy + 3yz − 6xy
Simplify:
ab + 15ab − 11ab − 2ab
Simplify:
6a2 − 3b2 + 2a2 + 5b2 − 4a2
Simplify:
8abc + 2ab − 4abc + ab
Simplify:
9xyz + 15yxz − 10zyx − 2zxy
Simplify:
13pqr + 2p + 4q − 6pqr + 5pqr
Simplify:
4ab + 0 − 2ba
Simplify:
6x2y − 2xy2 + 5x2y − xy2
Simplify:
6.4a + 5.3b − 2.4a − 2.2b
Simplify:
2.5a + 4.6b + 1.2a − 3.6b
Simplify:
`22"m"-12 1/2"n"-15"p"+16"n"`
Simplify:
`6"p"+2/3"q"-1 1/2"p"+1/3"q"+2"q"`
Simplify:
`2 2/3"xy"-3 1/2"xy"+3 1/3"xy"-2 1/2"xy"`
Selina solutions for Mathematics [English] Class 6 19 Fundamental Operations (Related to Algebraic Expressions) Exercise 19 (B)
Find the sum of 3a + 4b + 7c, − 5a + 3b − 6c and 4a − 2b − 4c.
Find the sum of 2x2 + xy − y2, − x2 + 2xy + 3y2 and 3x2 − 10xy + 4y2.
Find the sum of x2 − x + 1, − 5x2 + 2x − 2 and 3x2 − 3x + 1
Find the sum of a2 − ab + bc, 2ab + bc − 2a2 and − 3bc + 3a2 + ab.
Find the sum of 4x2 + 7 − 3x, 4x − x2 + 8 and − 10 + 5x − 2x2.
Find the sum of 3x + 4xy − y2, xy − 4x + 2y2 and 3y2 − xy + 6x.
Add the following expression:
− 17x2 − 2xy + 23y2, − 9y2 + 15x2 + 7xy and 13x2 + 3y2 − 4xy
Add the following expression:
− x2 − 3xy + 3y2 + 8, 3x2 − 5y2 − 3 + 4xy and − 6xy + 2x2 − 2 + y2
Add the following expression:
a3 − 2b3 + a, b3 − 2a3 + b and − 2b + 2b3 − 5a + 4a3
Evaluate:
3a − (a + 2b)
Evaluate:
(5x − 3y) − (x + y)
Evaluate:
(8a + 15b) − (3b − 7a)
Evaluate:
(8x + 7y) − (4y − 3x)
Evaluate:
7 − (4a − 5)
Evaluate:
(6y − 13) − (4 − 7y)
Subtract:
5a − 3b + 2c from a − 4b − 2c.
Subtract:
4x − 6y + 3z from 12x + 7y − 21z.
Subtract:
5 − a − 4b + 4c from 5a − 7b + 2c.
Subtract:
− 8x − 12y + 17z from x − y − z.
Subtract:
2ab + cd − ac − 2bd from ab − 2cd + 2ac + bd.
Take − ab + bc − ca from bc − ca + ab.
Take 5x + 6y − 3z from 3x + 5y − 4z.
Take `(-3)/2"p"+"q"-"r"` from `1/2"p"-1/3"q"-3/2"r".`
Take 1 − a + a2 from a2 + a + 1.
From the sum of x + y – 2z and 2x – y + z subtract x + y + z.
From the sum of 3a – 2b + 4c and 3b – 2c subtract a – b – c.
Subtract x – 2y – z from the sum of 3x – y + z and x + y – 3z.
Subtract the sum of x + y and x – z from the sum of x – 2z and x + y + z
By how much should x + 2y – 3z be increased to get 3x?
The sum of two expressions is 5x2 – 3y2. If one of them is 3x2 + 4xy – y2, find the other.
The sum of two expressions is 3a2 + 2ab – b2. If one of them is 2a2 + 3b2, find the other.
Selina solutions for Mathematics [English] Class 6 19 Fundamental Operations (Related to Algebraic Expressions) Exercise 19 (C)
Fill in the blanks:
6 × 3 = .............. and 6x × 3x = ............
Fill in the blanks:
6 × 3 = .............. and 6x2 × 3x3 = ............
Fill in the blanks:
5 × 4 = .............. and 5x × 4y = ............
Fill in the blanks:
4 × 7 = .............. and 4ax × 7x = ............
Fill in the blanks:
6 × 2 = .............. and 6xy × 2xy = ............
Fill in the blanks:
12 × 4 = .............. and 12ax2 × 4ax = ............
Fill in the blanks:
1 × 8 = .............. and a2xy2 × 8a3x2y = ............
Fill in the blanks:
15 × 3 = .............. and 15x × 3x5y2 = ............
Fill in the blank:
4x × 6x × 2 = .....................
Fill in the blank:
3ab × 6ax = ..................
Fill in the blank:
x × 2x2 × 3x3 = .....................
Fill in the blank:
5 × 5a3 = ................
Fill in the blank:
6 × 6x2 × 6x2y2 = ...................
Fill in the blank:
− 8x × − 3x = − ....................
Fill in the blank:
− 5 × − 3x × 5x2 = ..................
Fill in the blank:
8 × − 4xy2 × 3x3y2 = .............
Fill in the blank:
− 4x × 5xy × 3z = ....................
Fill in the blank:
5x × 2x2y × (− 7y3) × 2x3y2 = ...............
Find the value of 3x3 × 5x4
Find the value of 5a2 × 7a7
Find the value of 3abc × 6ac3
Find the value of a2b2 × 5a3b4
Find the value of 2x2y3 × 5x3y4
Find the value of abc × bcd
Multiply:
a + b by ab
Multiply:
3ab − 4b by 3ab
Multiply:
2xy − 5by by 4bx
Multiply:
4x + 2y by 3xy
Multiply:
x2 − x by 2x
Multiply:
1 + 4x by x
Multiply:
9xy2 + 3x2y by 5xy
Multiply:
6x − 5y by 3axy
Multiply:
− x + y − z and − 2x
Multiply:
xy − yz and x2yz2
Multiply:
2xyz + 3xy and − 2y2z
Multiply:
− 3xy2 + 4x2y and − xy
Multiply:
4xy and − x2y − 3x2y2
Multiply:
3a + 4b − 5c and 3a
Multiply:
− 5xy and − xy2 − 6x2y
Multiply:
x + 2 and x + 10
Multiply:
x + 5 and x – 3
Multiply:
x – 5 and x + 3
Multiply:
x – 5 and x – 3
Multiply:
2x + y and x + 3y
Multiply:
(3x – 5y) and (x + 6y)
Multiply:
(x + 9y) and (x – 5y)
Multiply:
(2x + 5y) and (2x + 5y)
Multiply:
3abc and − 5a2b2c
Multiply:
x − y + z and − 2x
Multiply:
2x − 3y − 5z and − 2y
Multiply:
− 8xyz + 10x2yz3 and xyz
Multiply:
xyz and − 13xy2z + 15x2yz − 6xyz2
Multiply:
4abc − 5a2bc − 6ab2c and − 2abc2
Find the product of xy − ab and xy + ab
Find the product of 2abc − 3xy and 2abc + 3xy
Find the product of a + b − c and 2a − 3b
Find the product of 5x − 6y − 7z and 2x + 3y
Find the product of 5x − 6y − 7z and 2x + 3y z
Find the product of 2a + 3b − 4c and a − b − c
Selina solutions for Mathematics [English] Class 6 19 Fundamental Operations (Related to Algebraic Expressions) Exercise 19 (D)
Divide:
3a by a
Divide:
15x by 3x
Divide:
16m by 4
Divide:
20x2 by 5x
Divide:
30p2 by 10p2
Divide:
14a3b3 by 2a2
Divide:
18pqr2 by 3pq
Divide:
100 by 50b
Simplify:
2x5 ÷ x2
Simplify:
6a8 ÷ 3a3
Simplify:
20xy ÷ − 5xy
Simplify:
− 24a2b2c2 ÷ 6ab
Simplify:
− 5x2y ÷ xy2
Simplify:
40p3q4r5 ÷ 10p3q
Simplify:
− 64x4y3z ÷ 4x3y2z
Simplify:
35xy5 ÷ 7x2y4
Divide:
`-(3"m")/4` by 2m
Divide:
− 15p6q8 by − 5p6q7
Divide:
− 21m5n7 by 14m2n2
Divide:
36a4x5y6 by 4x2a3y2
Divide:
20x3a6 by 5xy
Divide:
`(28"a"^2"b"^3)/"c"^2` by 4abc
Divide:
`(2"a"^2)/(9"b"^2)` by `(3"b")/(2"a")`
Divide:
`(-5.5"x"^2)/"y"` by `(11"x")/"y"`
Divide:
`(64"x"^2"y"^2)/"z"^2` by `(8"xy")/"z"`
Simplify:
`(-15"m"^5"n"^2)/(-3"m"^5)`
Simplify:
`(35"x"^4"y"^2)/(-15"x"^2"y"^2)`
Simplify:
`(-24"x"^6"y"^2)/(6"x"^6"y")`
Divide:
9x3 − 6x2 by 3x
Divide:
6m2 − 16m3 + 10m4 by − 2m
Divide:
15x3y2 + 25x2y3 − 36x4y4 by 5x2y2
Divide:
36a3x5 − 24a4x4 + 18a5x3 by − 6a3x3.
Solutions for 19: Fundamental Operations (Related to Algebraic Expressions)
Selina solutions for Mathematics [English] Class 6 chapter 19 - Fundamental Operations (Related to Algebraic Expressions)
Shaalaa.com has the CISCE Mathematics Mathematics [English] Class 6 CISCE solutions in a manner that help students grasp basic concepts better and faster. The detailed, step-by-step solutions will help you understand the concepts better and clarify any confusion. Selina solutions for Mathematics Mathematics [English] Class 6 CISCE 19 (Fundamental Operations (Related to Algebraic Expressions)) include all questions with answers and detailed explanations. This will clear students' doubts about questions and improve their application skills while preparing for board exams.
Further, we at Shaalaa.com provide such solutions so students can prepare for written exams. Selina textbook solutions can be a core help for self-study and provide excellent self-help guidance for students.
Concepts covered in Mathematics [English] Class 6 chapter 19 Fundamental Operations (Related to Algebraic Expressions) are Operation on Algebraic Expression, Algebra Terminology - Literal Numbers, Terms, Expressions, Factor, Coefficient, Polynomials, Degree, like and Unlike Terms, Concept for Unknowns Through Examples with Simple Contexts (Single Operations).
Using Selina Mathematics [English] Class 6 solutions Fundamental Operations (Related to Algebraic Expressions) exercise by students is an easy way to prepare for the exams, as they involve solutions arranged chapter-wise and also page-wise. The questions involved in Selina Solutions are essential questions that can be asked in the final exam. Maximum CISCE Mathematics [English] Class 6 students prefer Selina Textbook Solutions to score more in exams.
Get the free view of Chapter 19, Fundamental Operations (Related to Algebraic Expressions) Mathematics [English] Class 6 additional questions for Mathematics Mathematics [English] Class 6 CISCE, and you can use Shaalaa.com to keep it handy for your exam preparation.
