Which expressions are greater than $3 over 7$ .

Time taken by james = (2 x 5 + 1 )/2 minutes. = 11/2 minutes.
Solomon takes ( ( 2 x 4 + 3)/ 4 ) times more minutes. = 11/ 4
Hence, Solomon took 11/2 x 11/4 = 121/ 8 minutes.= 15 1/8 minutes.

At the pottery class, Eric made a clay mug measuring 6 $1 half$ inches. She also made a flower pot, which was 2 $1 half$ times taller than the mug. How tall was the pot?

Height of clay mug = ((6x 6) +1)/2= 37/6 inch.
Given, pot was ((2 x 2)+ 1) / 2 times taller = 5/2 times. Hence, height of pot = 37/6 x 5/2 = 185/12 = 15 5/12 inch

At the pottery class, Eric made a clay mug measuring 6 $1 half$ inches. She also made a flower pot, which was 2 $1 half$ times taller than the mug. How tall was the pot?

Height of clay mug = ((6x 6) +1)/2= 37/6 inch.
Given, pot was ((2 x 2)+ 1) / 2 times taller = 5/2 times. Hence, height of pot = 37/6 x 5/2 = 185/12 = 15 5/12 inch

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

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+0 =0. Multiplying with 0/1, we get 0 x 0 = 0

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

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

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

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.

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

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.

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

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.

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?

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

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

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. $2 over 3 cross times 9 over 9$

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

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

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.

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

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

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.

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

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

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

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

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

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

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

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

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

$1 2 over 5 cross times 2 over 3$

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.

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