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Question
kuta software - infinite pre-algebra
name
date__________ period
simplifying variable expressions
simplify each expression.
*day 3 - assignment
show all work!
- $-3p + 6p$
- $b - 3 + 6 - 2b$
- $7x - x$
- $7p - 10p$
- $-10v + 6v$
- $-9r + 10r$
- $9 + 5r - 9r$
- $1 - 3v + 10$
- $5n + 9n$
- $4b + 6 - 4$
- $35n - 1 + 46$
- $-33v - 49v$
- $30n + 8n$
- $7x + 31x$
- $10x + 36 - 38x - 47$
- $-2(7 - n) + 4$
- $-8(-5b + 7) + 5b$
- $-4p - (1 - 6p)$
- $4 - 5(-4n + 3)$
- $-7(k - 8) + 2k$
- $1 + 7(1 - 3b)$
- $3 - 8(7 - 5n)$
Step1: Combine like terms
$-3p + 6p = (-3 + 6)p$
Step2: Calculate coefficient sum
$(-3 + 6)p = 3p$
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Step1: Combine like terms
$b - 2b + (-3 + 6) = (1 - 2)b + 3$
Step2: Calculate sums
$(1 - 2)b + 3 = -b + 3$
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Step1: Combine like terms
$7x - x = (7 - 1)x$
Step2: Calculate coefficient sum
$(7 - 1)x = 6x$
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Step1: Combine like terms
$7p - 10p = (7 - 10)p$
Step2: Calculate coefficient sum
$(7 - 10)p = -3p$
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Step1: Combine like terms
$-10v + 6v = (-10 + 6)v$
Step2: Calculate coefficient sum
$(-10 + 6)v = -4v$
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Step1: Combine like terms
$-9r + 10r = (-9 + 10)r$
Step2: Calculate coefficient sum
$(-9 + 10)r = r$
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Step1: Combine like terms
$9 + 5r - 9r = 9 + (5 - 9)r$
Step2: Calculate coefficient sum
$9 + (5 - 9)r = 9 - 4r$
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Step1: Combine constant terms
$1 + 10 - 3v = 11 - 3v$
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Step1: Combine like terms
$5n + 9n = (5 + 9)n$
Step2: Calculate coefficient sum
$(5 + 9)n = 14n$
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Step1: Combine constant terms
$4b + (6 - 4) = 4b + 2$
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Step1: Combine constant terms
$35n + (-1 + 46) = 35n + 45$
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Step1: Combine like terms
$-33v - 49v = (-33 - 49)v$
Step2: Calculate coefficient sum
$(-33 - 49)v = -82v$
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Step1: Combine like terms
$30n + 8n = (30 + 8)n$
Step2: Calculate coefficient sum
$(30 + 8)n = 38n$
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Step1: Combine like terms
$7x + 31x = (7 + 31)x$
Step2: Calculate coefficient sum
$(7 + 31)x = 38x$
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Step1: Group like terms
$10x - 38x + 36 - 47 = (10 - 38)x + (36 - 47)$
Step2: Calculate sums
$(10 - 38)x + (36 - 47) = -28x - 11$
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Step1: Distribute the multiplier
$-2(7 - n) + 4 = -14 + 2n + 4$
Step2: Combine constants
$-14 + 4 + 2n = 2n - 10$
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Step1: Distribute the multiplier
$-8(-5b + 7) + 5b = 40b - 56 + 5b$
Step2: Combine like terms
$40b + 5b - 56 = 45b - 56$
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Step1: Remove parentheses
$-4p - (1 - 6p) = -4p - 1 + 6p$
Step2: Combine like terms
$-4p + 6p - 1 = 2p - 1$
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Step1: Distribute the multiplier
$4 - 5(-4n + 3) = 4 + 20n - 15$
Step2: Combine constants
$20n + 4 - 15 = 20n - 11$
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Step1: Distribute the multiplier
$-7(k - 8) + 2k = -7k + 56 + 2k$
Step2: Combine like terms
$-7k + 2k + 56 = -5k + 56$
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Step1: Distribute the multiplier
$1 + 7(1 - 3b) = 1 + 7 - 21b$
Step2: Combine constants
$1 + 7 - 21b = 8 - 21b$
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Step1: Distribute the multiplier
$3 - 8(7 - 5n) = 3 - 56 + 40n$
Step2: Combine constants
$40n + 3 - 56 = 40n - 53$
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- $3p$
- $-b + 3$
- $6x$
- $-3p$
- $-4v$
- $r$
- $9 - 4r$
- $11 - 3v$
- $14n$
- $4b + 2$
- $35n + 45$
- $-82v$
- $38n$
- $38x$
- $-28x - 11$
- $2n - 10$
- $45b - 56$
- $2p - 1$
- $20n - 11$
- $-5k + 56$
- $8 - 21b$
- $40n - 53$