Class 8 RD Sharma Solutions – Chapter 6 Algebraic Expressions and Identities – Exercise 6.3 | Set 2
Chapter 6 Algebraic Expressions and Identities – Exercise 6.3 | Set 1
Explain each of the products as monomials and verify the result in each case for x = 1
Question 18: (3x) * (4x) * (-5x)
Solution:
First, separate the numbers and variables.
= (3 * 4 * -5) * (x * x * x)
Add the powers of the same variable and multiply the numbers.
= (-60) * (x1+1+1)
= -60x3
Verification:
LHS = (3x) * (4x) * (-5x)
Putting x = 1 in LHS we get,
= (3 * 1) * (4 * 1) * (-5 * 1)
= 3 * 4 * -5
= -60
RHS = -60x3
Putting x = 1 in RHS we get,
= -60 * (1)3
= -60
LHS = RHS
Hence, verified.
Question 19: (4x2) * (-3x) * ((4/5)x3)
Solution:
First separate the numbers and variables.
= (4 * -3 * (4/5)) * (x2 * x * x3)
Add the powers of the same variable and multiply the numbers.
= (-48/5) * (x2+1+3)
= (-48/5)x6
Verification:
LHS = (4x2) * (-3x) * ((4/5)x3)
Putting x = 1 in LHS we get,
= (4 * 1) * (-3 * 1) * ((4/5) * 1)
= 4 * -3 * (4/5)
= (-48/5)
RHS = (-48/5)x6
Putting x = 1 in RHS we get,
= (-48/5) * (1)6
= -(48/5)
LHS = RHS
Hence, verified.
Question 20: (5x4) * (x2 )3 * (2x)2
Solution:
First separate the numbers and variables.
= (5 * 4) * (x4 * x6 * x2)
Add the powers of the same variable and multiply the numbers.
= (20) * (x4+6+2)
= (20)x12
Verification:
LHS = (5x4) * (x2)3 * (2x)2
Putting x = 1 in LHS we get,
= (5 * (1)4) * ((12))3 * (2 * 1)2
= (5 * 1) * (1)3 * (2)2
= 5 * 1 * 4
= 20
RHS = (20)x12
Putting x = 1 in RHS we get,
= (20) * (1)12
= 20
LHS = RHS
Hence, verified.
Question 21: (x2 )3 * (2x) * (-4x) * (5)
Solution:
First separate the numbers and variables.
= (2 *-4 * 5) * (x6 * x * x)
Add the powers of the same variable and multiply the numbers.
= (-40) * (x6+1+1)
= (-40)x8
Verification:
LHS = (x2)3 * (2x) * (-4x) * (5)
Putting x = 1 in LHS we get,
= (1)6 * (2 * 1) * (-4 * 1) * (5)
= 1 * 2 * -4 * 5
= -40
RHS = (-40)x8
Putting x = 1 in RHS we get,
= (-40) * (1)8
= -40
LHS = RHS
Hence, verified.
Question 22: Write down the product of -8x2y6 and -20xy. Verify the product for x = 2.5, y = 1.
Solution:
(-8x2y6 ) * (-20xy)
First separate the numbers and variables.
= (-8 * -20) * (x2 * x) * (y6 * y)
Add the powers of the same variable and multiply the numbers.
= 160 * (x2+1) * (y6+1)
= 160x3y7
Verification:
LHS = (-8x2y6) * (-20xy)
Putting x = 2.5 and y = 1 in LHS we get,
= (-8 * (2.5)2 * (1)6) * (-20 * 2.5 * 1)
= (-8 * 6.25 * 1) * (-20 * 25)
= -50 * -50
= 2500
RHS = 160x3y7
Putting x = 2.5 and y = 1 in RHS we get,
= -160 * (2.5)3 * (1)7
= -160 * 15.625
= 2500
LHS = RHS
Hence, verified.
Question 23: Evaluate (3.2x6y3) * (2.1x2y2) when x = 1 and y = 0.5.
Solution:
First, separate the numbers and variables.
= (3.2 * 2.1) * (x6 * x2) * (y3 * y2)
Add the powers of the same variable and multiply the numbers.
= 6.72 * (x6+2) * (y3+2)
= 6.72x8y5
Putting x = 1 and y = 0.5 in the result we get
= 6.72 * (1)8 * (0.5)5
= 6.72 * 0.03125
= 0.21
Question 24: Find the value of (5x6) * (-1.5x2y3) * (-12xy2) when x = 1, y = 0.5.
Solution:
First, separate the numbers and variables.
= (5 * -1.5 * -12) * (x6 * x2 * x) * (y3 * y2)
Add the powers of the same variable and multiply the numbers.
= 90 * (x6+2+1) * (y3+2)
= 90x9y5
Putting x = 1 and y = 0.5 in the result we get
= 90 * (1)9 * (0.5)5
= 90 * 1 * 0.03125
= 2.8125
Question 25: Evaluate when (2.3a5b2) * ((1.2)a2b2) when a = 1 and b = 0.5.
Solution:
First, separate the numbers and variables.
= (2.3 * 1.2) * (a5 * a2) * (b2 * b2)
Add the powers of the same variable and multiply the numbers.
= 2.76 * (a5+2) * (b2+2)
= 2.76a7b4
Putting a = 1 and b = 0.5 in the result we get
= 2.76 * (1)7 * (0.5)4
= 2.76 * 1 * 0.0625
= 0.1725
Question 26: Evaluate for (-8x2y6) * (-20xy) when x = 2.5 and y = 1.
Solution:
First, separate the numbers and variables.
= (-8 * -20) * (x2 * x) * (y6 * y)
Add the powers of the same variable and multiply the numbers.
= 160 * (x2+1) * (y6+1)
= 160x3y7
Putting x = 2.5 and y = 1 in the result we get
= 160 * (2.5)3 * (1)7
= 160 * 15.625 * 1
= 2500
Express each of the following products as monomials and verify the result for x = 1, y = 2: (27 – 31)
Question 27: (-xy3) * (yx3 ) * (xy)
Solution:
First separate the numbers and variables.
= (-1 * 1 * 1) * (x * x3 * x) * (y3 * y * y)
Add the powers of the same variable and multiply the numbers.
= -1 * (x1+3+1 ) * (y3+1+1)
= -x5y5
Verification:
LHS = (-xy3) * (yx3) * (xy)
Putting x = 1 and y = 2 in LHS we get,
= (-1 * (2)3) * (2 * (1)3 ) * (1 * 2)
= -8 * 2 * 2
= -32
RHS = -x5y5
Putting x = 1 and y = 2 in RHS we get,
= -1 * (1)5 * (2)5
= -32
LHS = RHS
Hence, verified.
Question 28: ((1/8) x2y4) * ((1/4) x4y2 ) * (xy) * (5)
Solution:
First, separate the numbers and variables.
= ((1/8) * (1/4) * 1 * 5) * (x2 * x4 * x) * (y4 * y2 * y)
Add the powers of the same variable and multiply the numbers.
= (5/32) * (x2+4+1) * (y4+2+1)
= (5/32)x7 y7
Verification:
LHS = ((1/8) x2y4) * ((1/4) x4y2) * (xy) * (5)
Putting x = 1 and y = 2 in LHS we get,
= ((1/8) * (1)2 * (2)4) * ((1/4) * (1)4 * (2)2) * (1 * 2) * (5)
= 2 * 1 * 2 * 5
= 20
RHS = (5/32)x7y7
Putting x = 1 and y = 2 in RHS we get,
= (5/32) * (1)7 * (2)7
= (5/32) * (128)
= 20
LHS = RHS
Hence, verified
Question 29: (2/5)a2b * (-15b2ac) * ((-1/2)c2)
Solution:
First, separate the numbers and variables.
= ((2/5) * (-15) * (-1/2)) * (a2 * a) * (b* b2) * (c * c2)
Add the powers of the same variable and multiply the numbers.
= 3 * (a2+1) * (b1+2 ) * (c1+2)
= 3a3b3c3
This expression does not contain x and y . Hence the result cannot be verified for x = 1 and y = 2.
Question 30: ((-4/7)a2b) * ((-2/3)b2c) * ((-7/6)c2a)
Solution:
First separate the numbers and variables.
= ((-4/7) * (-2/3) * (-7/6)) * (a2 * a) * (b* b2) * (c * c2)
Add the powers of the same variable and multiply the numbers.
= (-4/9) * (a2+1) * (b1+2) * (c1+2)
= (-4/9)a3b3c3
This expression does not contain x and y . Hence the result cannot be verified for x = 1 and y = 2.
Question 31: ((4/9)abc3) * ((-27/5)a3b2) * (-8b3c)
Solution:
First, separate the numbers and variables.
= ((4/9) * (-27/5) * (-8)) * (a * a3) * (b * b2 * b3) * (c3 * c)
Add the powers of the same variable and multiply the numbers.
= (96/5) * (a1+3) * (b1+2+3) * (c3+1)
= (96/5)a4b6c4
This expression does not contain x and y. Hence, the result cannot be verified for x = 1 and y = 2.
Evaluate each of the following when x = 2 and y = -1.
Question 32: (2xy) * ((x2y) /4) * (x2) * (y2)
Solution:
First, separate the numbers and variables.
= (2 * (1/4)) * (x * x2 * x2) * (y * y * y2)
Add the powers of the same variable and multiply the numbers.
= (1/2) * (x1+2+2) * (y1+1+2)
= (1/2)x5y4
Putting x = 2 and y = -1 in the result we get,
= (1/2) * ( 2)5 * (-1)4
= 16
Question 33: (3/5)x2y * ((-15/4) * x * y2) * ((7/9) x2y2)
Solution:
First, separate the numbers and variables.
= ((3/5) * (-15/4) * (7/9)) * (x2 * x * x2) * (y * y2 * y2)
Add the powers of the same variable and multiply the numbers.
= (-7/4) * (x2+1+2) * (y1+2+2)
= (-7/4)x5y5
Putting x = 2 and y = -1 in the result we get,
= (-7/4) * ( 2)5 * (-1)5
= -56
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