Q.1. Get the algebraic expressions in the following cases using variables, constants, and arithmetic operations:
(i) Subtraction of z from y.
Ans: y - z
(ii) One-half of the sum of numbers x and y.
Ans: (x + y)/2
(iii) The number z multiplied by itself.
Ans: Z2
(iv) One-fourth of the product of numbers p and q.
Ans: pq/4
(v) Numbers x and y both squared and added.
Ans: x2 + y2
(vi) Number 5 added to three times the product of m and n.
Ans: 3mn + 5
(vii) A product of numbers y and z subtracted from 10.
Ans: 10 - yz
(viii) Sum of numbers a and b subtracted from their product.
Ans: ab - (a + b)
Q.2. (i) Identify the terms and their factors in the following expressions, show the terms and factors by tree diagram:
(a) x - 3
Ans:
(b) 1 + x + x2
Ans:
(c) y - y3
Ans:
(d) 5xy2 + 7x2y
Ans:
(e) -ab + 2b2 - 3a2
Ans:
(a) -4x + 5
(b) -4x + 5y
Ans:
Terms: -4x, 5y
Factors: -4,x ; 5,y
(c) 5y + 3y2
Ans:
Terms: 5y,3y2
Factors: 5, y ; 3,y,y
(d) xy + 2x2y2
Ans:
Terms: xy, 2x2y2
Factors: x, y ; 2x, x, y, y
(e) pq + q
Ans:
Terms: pq, q
Factors: p, q ; q
(f) 1.2ab - 2.4b + 3.6a
Ans:
Terms: 1,2ab.-2.4b,3 6a
Factors: 1.2.a.b ; -2.4,6 ; 3.6,a
(g)
Ans:
(h) 0.1 p2 + 0.2q2
Ans:
Terms: 0.1 p2,0.2q2
Factors: 0. 1,p,p, ; 0.2, q,q
Q.3. Identify the numerical coefficients of terms (other than constants) in the following expressions:
(i) 5 - 3t2
(ii) 1 + t + t2 + t2
(iii) x + 2xy + 3y
(iv) 100m + 1000n
(v) -p2q2 + 7pq
(vi) 1.2a + 0.8b
(vii) 3.14 r2
(viii) 2(l + b)
(ix) 0.1y + 0.01y2
Ans:
Q.4. (a) Identify terms which contain x and give the coefficient of x.
(i) y2x + y
(ii) 13y2 - 8yx
(iii) x + y + 2
(iv) 5 + z + zx
(v) 1 + x + xy
(vi) 12xy2 + x25
(vii) 7x + xy2
Ans:
(b) Identify terms which contain y2 and give the coefficient of y2.
(i) 8 - xy2
(ii) 5y2 + 7x
(iii) 2x2y - 15xy2 + 7y2
Ans:
Q.5. Classify into monomials, binomials and trinomials:
(i) 4y - 7x
(ii) y2
(iii) x + y - xy
(iv) 100
(v) ab - a - b
(vi) 5 - 3t
(vii) 4p2q - 4pq2
(viii) 7mn
(ix) z2 - 3z + 8
(x) a2 + b2
(xi) z2 + z
(xii) 1 + x + x2
Ans:
Q.6. State whether a given pair of terms is of like or unlike terms:
(i) 1,100
(ii)
(iii) -29x, -29y
(iv) 14xy, 42 yx
(v) 4m2p, 4mp2
(vi) 12xz, 12x2 z2
Ans:
Q.7. Identify like terms in the following:
(a) -xy2, -4yx2, 8x2, 2xy2, 7y, -11x2 - 100x, - 11yx, 20x2y, -6x2, y, 2xy, 3x
Ans: Like terms are:
(i) -xy2,2 xy2
(ii) -4yx2 , 20x2y
(iii) 8x2,-11x2,-6x2
(iv) 7y, y
(v) -100x, 3x
(vi) -11yx, 2xy
(b) 10pq, 7p, 8q, -p2q2, -7qp, -100q, -23, 12q2p2, -5p2, 41,2405 p, 78qp, 13p2q, qp2, 701p2
Ans: Like terms are:
(i) 10 pq - 7 pq,78 pq
(ii) 7p, 2405 p
(iii) 8q,- 100q
(iv) -p2q2, 12p2q2
(v) -12,41
(vi) -5p2,701p2
(vii) 13 p2q,qp2
Q1: If m = 2, find the value of:
(i) m - 2
(ii) 3m - 5
(iii) 9 - 5m
(iv) 3m2 - 2m - 7
(v)
Ans:
(i) m - 2 = 2 - 2 [Putting m = 2]
= 0
(ii) 3m - 5 = 3 x 2 - 5 [Putting m = 2]
= 6 - 5 = 1
(iii) 9 - 5m = 9 - 5 x 2 [Putting m = 2]
= 9 - 10 = - 1
(iv) 3m2 - 2m - 7
= 3(2)2 - 2 (2) - 7 [Putting m = 2]
= 3 x 4 - 2 x 2 - 7
= 12-4-7
= 12- 11 = 1
(v) [Putting m = 2]
= 5 - 4 = 1
Q2: If p = -2, find the value of:
(i) 4p + 7
(ii) - 3p2 + 4p + 7
(iii) -2p3 - 3p2 +4/7 + 7
Ans:
(i) 4p + 7 = 4 (- 2) + 7 [Putting p= -2]
= -8 + 7 = -1
(ii) -3p2+4p + 7
= -3 (-2)2+ 4 (-2) + 7 [Putting p = - 2]
= - 3 x 4 - 8 + 7
= - 12 - 8 + 7
= -20 + 7 = -13
(iii) - 2p3 - 3p2 +4p + 7
= - 2 (-2)3 - 3(-2)2 + 4 (-2) + 7 [Putting p = - 2]
= -2 x(-8)-3 x4 -8 + 7
= 16-12-8 + 7
= -20 + 23 = 3
Q3: Find the value of the following expressions, when x = -1:
(i) 2x - 7
(ii) -x + 2
(iii) x2 + 2x + 1
(iv) 2x2- x - 2
Ans:
(i) 2x - 7 = 2 (-1) - 7 [Putting x= - 1]
= - 2 - 7 = - 9
(ii) - x + 2 = - (-1) + 2 [Putting x= - 1]
= 1 + 2 = 3
(iii) x2 + 2 x + 1 = (-1)2 + 2 (-1) + 1 [Putting x= - 1]
= 1 - 2 + 1
= 2 - 2 = 0
(iv) 2x2- x - 2 = 2 (-1)2 - (-1) - 2 [Putting x= - 1]
= 2x1 + 1-2
= 2 + 1 - 2
= 3 - 2 = 1
Q4: If a = 2,b = -2, find the value of:
(i) a2 + b2
(ii) a2+ab + b2
(iii) a2 - b2
Ans:
(i) a2 + b2 ( 2)2 + (- 2)2 [Putting a = 2. b = - 2 ]
= 4 + 4 = 8
(ii) a2+ab + b2
= (2) + ( 2) (- 2) +(-2)2 [Putting a = 2. b = - 2 ]
= 4 - 4 + 4 = 4
(iii) a2 - b2 = (2)2 - (-2)2 [Putting a = 2,b = - 2]
= 4 - 4 = 0
Q5: When a = 0, b = -1, find the value of the given expressions:
(i) 2a + 2b
(ii) 2a2+b2+1
(iii) 2a2b + 2ab2 +ab
(iv) a2+ab+2
Ans:
(i) 2a + 2b = 2 (0) + 2 (-1) [Putting a - 0,b = - 1]
= 0 - 2 = -2
(ii) 2a2 + b2 + 1 = 2 (0)2 + (-1)2 + 1 [Putting a - 0,b = - 1]
= 2 x 0 + 1+ 1 = 0 + 2 = 2
(iii) 2a2b + 2ab2 + ab = 2(0)2 (-1) + 2 (0 )(-1)2 + (0 )(-1) [Putting a - 0,b = - 1]
= 0 + 0 + 0 = 0
(iv) a2 +ab + 2 - (0)2 + (0) (-1) + 2 [Putting a - 0,b = - 1]
= 0 + 0 + 2 = 2
Q6: Simplify the expressions and find the value if x is equal to 2:
(i) x + 7 + 4 (x- 5)
(ii) 3 (x + 2) + 5x - 7
(iii) 6x + 5 (x - 2)
(iv) 4 (2x - 1) + 3x + 11
Ans:
(i) x + 7 + 4(x- 5) = x + 7 + 4x - 20 = x + 4 x + 7 - 20
= 5 x - 13 = 5 x 2 - 13 [Putting x = 2]
= 10-13 = -3
(ii) 3 (x+ 2) + 5x - 7 = 3x + 6 + 5x -7 = 3x + 5x + 6 - 7
= 8x - 1 = 8 x 2-1 [Putting x = -1]
= 16 - 1 = 15
(iii) 6x + 5 (x - 2) = 6x + 5x -10 = 11x - 10
= 11 x 2 - 10 [Putting x = -1]
= 22 - 10 = 12
(iv) 4(2x - 1) + 3x + 11 = 8x - 4 + 3x +11 = 8x + 3a - 4 + 11
= 11a + 7 = 11 x 2 + 7 [Putting x = - 1]
= 22+7 = 29
Q7: Simplify these expressions and find their values if x = 3,a = -1, b = - 2 :
(i) 3x - 5 - x + 9
(ii) 2 - 8x + 4x + 4
(iii) 3a + 5 - 8a + 1
(iv) 10 - 3b - 4 - 5b
(v) 2a - 2b - 4 - 5 + a
Ans:
(i) 3a - 5 - x + 9 = 3x - x - 5 + 9 = 2x + 4
= 2x3+4 [Putting a = 3]
= 6 + 4 = 10
(ii) 2 - 8x + 4x + 4 = - 8x + 4x + 2 + 4 = -4x + 6
= - 4 x 3 + 6 [Putting a = 3]
= -12 + 6 =12
(iii) 3a + 5 - 8a + 1 = 3a - 8a + 5 + 1 = - 5a + 6
= -5(- 1) + 6 [Putting a = - 1]
= 5 + 6 = 11
(iv) 10 - 3b - 4 - 5b = - 3b - 5b + 10 - 4 = -8b+6
= -8 (-2)+ 6 [Putting b = -2]
= 16 + 6 = 22
(v) 2a - 2b - 4 - 5 + a = 2a + a - 2b - 4 - 5
= 3a - 2b - 9 = 3 (-1)-2 (-2) -9 [Putting a = -1 , b = - 2]
= -3 + 4 -9 = -8
Q8:
(i) If z = 10, find the value of z3 - 3 (z - 10).
(ii) If p = - 10, find the value of p2 - 2p - 100
Ans:
(i) z3 -3(z-10) = (10)3-3(10 - 10) [Putting z = 10]
= 1000 - 3 x 0 = 1000- 0
= 1000
(ii) p2 - 2p - 100 = (-10)2 - 2 (-10) - 100 (Putting p = - 10]
= 100+ 20 - 100 = 20
Q9: What should be the value of a if the value of 2x2 + x - a equals to 5, when x = 0 ?
Ans:
Given: 2x2 + x - a = 5
⇒ 2 (0)2 + 0 - a = 5 [Putting x = 0]
⇒ 0 + 0 - a = 5
⇒ a = -5
Hence, the value of a is -5.
Q10: Simplify the expression and find its value when a = 5 and b = - 3: 2 (a2 + ab) + 3 - ab
Ans:
Given: 2 (a2 + ab) + 3 - ab
⇒ 2a2 + 2ab + 3 - ab
⇒ 2a2 + 2ab - ab + 3
⇒ 2a2 + ab + 3
⇒ 2 (5)2 + (5) (-3) + 3 [Putting a = 5 , b = -3]
⇒ 2 x 25 - 15 + 3
⇒ 50 - 15 + 3
⇒ 38
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1. What are algebraic expressions? |
2. How do you simplify algebraic expressions? |
3. What is the difference between an algebraic expression and an algebraic equation? |
4. How can algebraic expressions be used in real-life situations? |
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