Add and Subtract Rational Numbers - 7th Grade Math
Card 1 of 25
What is the value of $-4+(-9)$ using the associative property to group signs?
What is the value of $-4+(-9)$ using the associative property to group signs?
Tap to reveal answer
$-13$. Same signs add: $-4+(-9)=-13$.
$-13$. Same signs add: $-4+(-9)=-13$.
← Didn't Know|Knew It →
What is the value of $(
rac{2}{3}-
rac{5}{6})+
rac{1}{6}$ using associativity?
What is the value of $( rac{2}{3}- rac{5}{6})+ rac{1}{6}$ using associativity?
Tap to reveal answer
$0$. Combine fractions: $
rac{4}{6}-
rac{5}{6}+
rac{1}{6}=0$.
$0$. Combine fractions: $ rac{4}{6}- rac{5}{6}+ rac{1}{6}=0$.
← Didn't Know|Knew It →
What is the value of $18+(-18)+7$ by rearranging terms?
What is the value of $18+(-18)+7$ by rearranging terms?
Tap to reveal answer
$7$. Use $18+(-18)=0$, then $0+7=7$.
$7$. Use $18+(-18)=0$, then $0+7=7$.
← Didn't Know|Knew It →
What is the sign of $-(a-b)$ when rewritten using distribution?
What is the sign of $-(a-b)$ when rewritten using distribution?
Tap to reveal answer
$-(a-b)=-a+b$. Negative distributes as $-a$ and $+b$.
$-(a-b)=-a+b$. Negative distributes as $-a$ and $+b$.
← Didn't Know|Knew It →
What is the value of $-7+12$ using addition properties?
What is the value of $-7+12$ using addition properties?
Tap to reveal answer
$5$. Start at $-7$, move right $12$ units.
$5$. Start at $-7$, move right $12$ units.
← Didn't Know|Knew It →
What is the sign of $-(a+b)$ when rewritten using distribution?
What is the sign of $-(a+b)$ when rewritten using distribution?
Tap to reveal answer
$-(a+b)=-a+(-b)$. Distribute the negative sign to both terms.
$-(a+b)=-a+(-b)$. Distribute the negative sign to both terms.
← Didn't Know|Knew It →
What is the most useful way to rewrite $a+(-b)$ as a subtraction expression?
What is the most useful way to rewrite $a+(-b)$ as a subtraction expression?
Tap to reveal answer
$a+(-b)=a-b$. Adding a negative is the same as subtracting.
$a+(-b)=a-b$. Adding a negative is the same as subtracting.
← Didn't Know|Knew It →
What is the value of $-3-8+3$ by regrouping additive inverses?
What is the value of $-3-8+3$ by regrouping additive inverses?
Tap to reveal answer
$-8$. Rearrange: $-3+3-8=0-8=-8$.
$-8$. Rearrange: $-3+3-8=0-8=-8$.
← Didn't Know|Knew It →
Find and correct the error: $6-(-2)=6+(-2)=4$. What is the correct value?
Find and correct the error: $6-(-2)=6+(-2)=4$. What is the correct value?
Tap to reveal answer
Correct value: $6-(-2)=6+2=8$. Error: $-(-2)=+2$, not $-2$.
Correct value: $6-(-2)=6+2=8$. Error: $-(-2)=+2$, not $-2$.
← Didn't Know|Knew It →
What is the value of $-
rac{3}{4}+
rac{1}{2}$ using a common denominator?
What is the value of $- rac{3}{4}+ rac{1}{2}$ using a common denominator?
Tap to reveal answer
$-
rac{1}{4}$. Convert to fourths: $-
rac{3}{4}+
rac{2}{4}=-
rac{1}{4}$.
$- rac{1}{4}$. Convert to fourths: $- rac{3}{4}+ rac{2}{4}=- rac{1}{4}$.
← Didn't Know|Knew It →
What is the value of $9-14$ by rewriting subtraction as addition?
What is the value of $9-14$ by rewriting subtraction as addition?
Tap to reveal answer
$-5$. Rewrite as $9+(-14)=-5$.
$-5$. Rewrite as $9+(-14)=-5$.
← Didn't Know|Knew It →
What is the value of $
rac{5}{6}-
rac{1}{3}$ by rewriting as addition?
What is the value of $ rac{5}{6}- rac{1}{3}$ by rewriting as addition?
Tap to reveal answer
$
rac{1}{2}$. Convert to sixths: $
rac{5}{6}-
rac{2}{6}=
rac{3}{6}=
rac{1}{2}$.
$ rac{1}{2}$. Convert to sixths: $ rac{5}{6}- rac{2}{6}= rac{3}{6}= rac{1}{2}$.
← Didn't Know|Knew It →
What is the value of $-2.5-(-1.8)$ using properties of subtraction?
What is the value of $-2.5-(-1.8)$ using properties of subtraction?
Tap to reveal answer
$-0.7$. Rewrite as $-2.5+1.8=-0.7$.
$-0.7$. Rewrite as $-2.5+1.8=-0.7$.
← Didn't Know|Knew It →
What is $-(-a)$ equal to for any rational number $a$?
What is $-(-a)$ equal to for any rational number $a$?
Tap to reveal answer
$-(-a)=a$. The opposite of an opposite is the original number.
$-(-a)=a$. The opposite of an opposite is the original number.
← Didn't Know|Knew It →
Find the value of $12 - 7$ by rewriting subtraction as addition.
Find the value of $12 - 7$ by rewriting subtraction as addition.
Tap to reveal answer
$5$. Rewrite as $12 + (-7) = 5$.
$5$. Rewrite as $12 + (-7) = 5$.
← Didn't Know|Knew It →
Find the value of $\frac{2}{3} - \frac{5}{3}$ by using $a - b = a + (-b)$.
Find the value of $\frac{2}{3} - \frac{5}{3}$ by using $a - b = a + (-b)$.
Tap to reveal answer
$-1$. Same denominator: $\frac{2}{3} + (-\frac{5}{3}) = -\frac{3}{3} = -1$.
$-1$. Same denominator: $\frac{2}{3} + (-\frac{5}{3}) = -\frac{3}{3} = -1$.
← Didn't Know|Knew It →
Find the value of $-3 - 8$ by rewriting as $-3 + (-8)$.
Find the value of $-3 - 8$ by rewriting as $-3 + (-8)$.
Tap to reveal answer
$-11$. Rewrite as $-3 + (-8) = -11$.
$-11$. Rewrite as $-3 + (-8) = -11$.
← Didn't Know|Knew It →
Find the value of $5 - (-6)$ by rewriting as $5 + 6$.
Find the value of $5 - (-6)$ by rewriting as $5 + 6$.
Tap to reveal answer
$11$. Subtracting negative is adding: $5 + 6 = 11$.
$11$. Subtracting negative is adding: $5 + 6 = 11$.
← Didn't Know|Knew It →
Find the value of $-10 - (-4)$ by rewriting subtraction as addition.
Find the value of $-10 - (-4)$ by rewriting subtraction as addition.
Tap to reveal answer
$-6$. Rewrite as $-10 + 4 = -6$.
$-6$. Rewrite as $-10 + 4 = -6$.
← Didn't Know|Knew It →
Find the value of $(-2) + 9 + (-7)$ using grouping to make an easy sum.
Find the value of $(-2) + 9 + (-7)$ using grouping to make an easy sum.
Tap to reveal answer
$0$. Group: $(-2) + (-7) + 9 = -9 + 9 = 0$.
$0$. Group: $(-2) + (-7) + 9 = -9 + 9 = 0$.
← Didn't Know|Knew It →
Find the value of $15 + (-6) + (-9)$ by using associativity to group terms.
Find the value of $15 + (-6) + (-9)$ by using associativity to group terms.
Tap to reveal answer
$0$. Group: $15 + (-15) = 0$ since $(-6) + (-9) = -15$.
$0$. Group: $15 + (-15) = 0$ since $(-6) + (-9) = -15$.
← Didn't Know|Knew It →
Find the value of $-1 + \frac{3}{4} - \frac{1}{4}$ by rewriting subtraction as addition.
Find the value of $-1 + \frac{3}{4} - \frac{1}{4}$ by rewriting subtraction as addition.
Tap to reveal answer
$ -\frac{1}{2} $. Combine: $ -1 + \frac{3}{4} + (-\frac{1}{4}) = -1 + \frac{1}{2} = -\frac{1}{2} $.
$ -\frac{1}{2} $. Combine: $ -1 + \frac{3}{4} + (-\frac{1}{4}) = -1 + \frac{1}{2} = -\frac{1}{2} $.
← Didn't Know|Knew It →
What property is shown by $a + b = b + a$ when adding rational numbers?
What property is shown by $a + b = b + a$ when adding rational numbers?
Tap to reveal answer
Commutative property of addition. Order doesn't matter when adding rational numbers.
Commutative property of addition. Order doesn't matter when adding rational numbers.
← Didn't Know|Knew It →
What property is shown by $(a + b) + c = a + (b + c)$ for rational numbers?
What property is shown by $(a + b) + c = a + (b + c)$ for rational numbers?
Tap to reveal answer
Associative property of addition. Grouping doesn't change the sum of rational numbers.
Associative property of addition. Grouping doesn't change the sum of rational numbers.
← Didn't Know|Knew It →
What is the additive identity property written as $a + 0 = a$ called?
What is the additive identity property written as $a + 0 = a$ called?
Tap to reveal answer
Additive identity (identity property of addition). Adding zero to any number leaves it unchanged.
Additive identity (identity property of addition). Adding zero to any number leaves it unchanged.
← Didn't Know|Knew It →