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Mathematics

Grade5

Easy

Question

$left parenthesis 0 plus 0 right parenthesis cross times 0 over 1$

0
1
6
-1

hint Hint:

Follow the BODMAS rule

The correct answer is: 0

$left parenthesis 0 plus 0 right parenthesis cross times 0 over 1 equals 0$

Follow the BODMAS rule, which states Brackets Off Division Multiplication Addition Subtraction. This rule gives us the precedence of simple mathematical operations. Adding the terms inside the bracket, we get 0+0 =0. Multiplying with 0/1, we get 0 x 0 = 0

Related Questions to study

$left parenthesis 4 plus 0 right parenthesis cross times 1 over 1$

Follow the BODMAS rule, which states Brackets Off Division Multiplication Addition Subtraction. This rule gives us the precedence of simple mathematical operations. Adding the terms inside the bracket, we get 0+4 =4. Multiplying with 1/1, we get 4 x 1/1= 4

$left parenthesis 4 plus 0 right parenthesis cross times 1 over 1$

MathematicsGrade5

Follow the BODMAS rule, which states Brackets Off Division Multiplication Addition Subtraction. This rule gives us the precedence of simple mathematical operations. Adding the terms inside the bracket, we get 0+4 =4. Multiplying with 1/1, we get 4 x 1/1= 4

$left parenthesis 2 plus 4 right parenthesis cross times 7 over 2$

Follow the BODMAS rule. Adding the terms inside the bracket, we get 2+4 =6. Multiplying with 7/2 , we get 6 x 7/2 =21.

$left parenthesis 2 plus 4 right parenthesis cross times 7 over 2$

MathematicsGrade5

Follow the BODMAS rule. Adding the terms inside the bracket, we get 2+4 =6. Multiplying with 7/2 , we get 6 x 7/2 =21.

$left parenthesis 1 plus 1 right parenthesis cross times 1 half$

Follow the BODMAS rule. Adding the terms inside the bracket, we get 1+1 =2. Multiplying with 1/2 , we get 2 x 1/2 =1.

$left parenthesis 1 plus 1 right parenthesis cross times 1 half$

MathematicsGrade5

Follow the BODMAS rule. Adding the terms inside the bracket, we get 1+1 =2. Multiplying with 1/2 , we get 2 x 1/2 =1.

parallel

Which expressions are less than 710?

9/5 is greater than 1
7/4 is greater than 1
8/7 is greater than 1
¾ is less than 1
Hence, ¾ x 710 is less than 710.

Which expressions are less than 710?

MathematicsGrade5

9/5 is greater than 1
7/4 is greater than 1
8/7 is greater than 1
¾ is less than 1
Hence, ¾ x 710 is less than 710.

$open parentheses 0 plus 3 1 over 9 close parentheses cross times 7 over 3$

Follow the BODMAS rule. Let’s convert the mixed fraction into the improper fraction. We get, ((9 x 3 +1)/9) =28/9. on adding the terms inside the bracket, we get 0 + 28/9= 28/9 Now, lets calculate 28/9 x 7/3; we get 196/27

$open parentheses 0 plus 3 1 over 9 close parentheses cross times 7 over 3$

MathematicsGrade5

Follow the BODMAS rule. Let’s convert the mixed fraction into the improper fraction. We get, ((9 x 3 +1)/9) =28/9. on adding the terms inside the bracket, we get 0 + 28/9= 28/9 Now, lets calculate 28/9 x 7/3; we get 196/27

Without multiplying, order the following products from the least to the greatest.
A. $2 over 3 cross times 8 over 3$
B. $2 over 3 cross times 3 over 5$
C. $2 over 3 cross times 9 over 9$

BCA
8/3= 2 2/3 is greater than 1
3/5 is less than 1
9/9 is equal to 1
Hence, the order is BCA

Without multiplying, order the following products from the least to the greatest.
A. $2 over 3 cross times 8 over 3$
B. $2 over 3 cross times 3 over 5$
C. $2 over 3 cross times 9 over 9$

MathematicsGrade5

BCA
8/3= 2 2/3 is greater than 1
3/5 is less than 1
9/9 is equal to 1
Hence, the order is BCA

parallel

$open parentheses 1 1 over 8 plus 2 close parentheses cross times 1 over 1$

Follow the BODMAS rule. Let’s convert the mixed fraction into the improper fraction. We get, ((8 x 1 +1)/8) =9/8. on adding the terms inside the bracket, we get 2 + 9/8= 25/8. Now, lets calculate 25/8 x 1/1; we get 25/8.

$open parentheses 1 1 over 8 plus 2 close parentheses cross times 1 over 1$

MathematicsGrade5

Follow the BODMAS rule. Let’s convert the mixed fraction into the improper fraction. We get, ((8 x 1 +1)/8) =9/8. on adding the terms inside the bracket, we get 2 + 9/8= 25/8. Now, lets calculate 25/8 x 1/1; we get 25/8.

$open parentheses 1 plus 2 1 over 8 close parentheses cross times 1 half$

Follow the BODMAS rule. Let’s convert the mixed fraction into the improper fraction. We get, ((8 x 2 +1)/8) =17/8. on adding the terms inside the bracket, we get 1 + 17/8= 25/8. Now, lets calculate 25/8 x 1/2; we get 25/16.

$open parentheses 1 plus 2 1 over 8 close parentheses cross times 1 half$

MathematicsGrade5

Follow the BODMAS rule. Let’s convert the mixed fraction into the improper fraction. We get, ((8 x 2 +1)/8) =17/8. on adding the terms inside the bracket, we get 1 + 17/8= 25/8. Now, lets calculate 25/8 x 1/2; we get 25/16.

$open parentheses 7 1 over 7 plus 1 over 7 close parentheses cross times 1 over 7$

convert the mixed fractions into improper fractions. Then follow BODMAS rule. We get ((7 x7)+ 1)/7 + 1/7 = 50/7 + 1/7 = 51/7 . Now, let’s multiply 51/7 x 1/7, we get 51/49

$open parentheses 7 1 over 7 plus 1 over 7 close parentheses cross times 1 over 7$

MathematicsGrade5

convert the mixed fractions into improper fractions. Then follow BODMAS rule. We get ((7 x7)+ 1)/7 + 1/7 = 50/7 + 1/7 = 51/7 . Now, let’s multiply 51/7 x 1/7, we get 51/49

parallel

$open parentheses 1 2 over 5 plus 1 third close parentheses cross times 7 over 3$

convert the mixed fractions into improper fractions. Then follow BODMAS rule. We get ((5 x1)+ 2)/5 + 7/3 = 26/15 . Now, let’s multiply 26/15 x 7/13, we get 14/15

$open parentheses 1 2 over 5 plus 1 third close parentheses cross times 7 over 3$

MathematicsGrade5

convert the mixed fractions into improper fractions. Then follow BODMAS rule. We get ((5 x1)+ 2)/5 + 7/3 = 26/15 . Now, let’s multiply 26/15 x 7/13, we get 14/15

$1 2 over 5 cross times 2 over 3$

Let’s convert the mixed fractions into improper fractions. We get ((5 x 1) +2)/5 and 2/3, i.e., 7/5 and 2/3. Let’s calculate the product 7/5 x 2/3 we get 14/15

$1 2 over 5 cross times 2 over 3$

MathematicsGrade5

Let’s convert the mixed fractions into improper fractions. We get ((5 x 1) +2)/5 and 2/3, i.e., 7/5 and 2/3. Let’s calculate the product 7/5 x 2/3 we get 14/15

$open parentheses 1 over 7 plus 1 half close parentheses cross times 1 7 over 2$

Follow the BODMAS rule. So, first let’s add 1/7 and 1/3, we get 9/14. Now , convert the mixed fraction into improper fraction, we get 9/2. Multiplying 9/14 x 9/2 , we get 81/28. This isn’t given in any of the options, so, answer is none of the above.

$open parentheses 1 over 7 plus 1 half close parentheses cross times 1 7 over 2$

MathematicsGrade5

Follow the BODMAS rule. So, first let’s add 1/7 and 1/3, we get 9/14. Now , convert the mixed fraction into improper fraction, we get 9/2. Multiplying 9/14 x 9/2 , we get 81/28. This isn’t given in any of the options, so, answer is none of the above.

parallel

$2 over 15 cross times 1 1 half$

Let’s convert the mixed fractions into improper fractions. We get 2/15 and ((2 x 1) + 1)/2, i.e., 2/15 and 3/2. Let’s calculate the product 2/15 x 3/2 we get 1/5

$2 over 15 cross times 1 1 half$

MathematicsGrade5

Let’s convert the mixed fractions into improper fractions. We get 2/15 and ((2 x 1) + 1)/2, i.e., 2/15 and 3/2. Let’s calculate the product 2/15 x 3/2 we get 1/5

Compare using >, <, or =
$17 8 over 7 space box enclose blank end enclose space 17$ .

Compare using >, <, or =
$17 8 over 7 space box enclose blank end enclose space 17$ .

MathematicsGrade5

$2 over 2 cross times 1 1 third$

Let’s convert the mixed fractions into improper fractions. We get 2/2 and ((3 x 1) + 1)/3, i.e., 2/2 and 4/3. Let’s calculate the product 2/2 x 4/3 we get 4/3

$2 over 2 cross times 1 1 third$

MathematicsGrade5

Let’s convert the mixed fractions into improper fractions. We get 2/2 and ((3 x 1) + 1)/3, i.e., 2/2 and 4/3. Let’s calculate the product 2/2 x 4/3 we get 4/3

parallel

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