(a) The value of 2 x y + 7 .

Question

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Answer 1

Question

Chapter 39, Problem 21A

To determine

(a)

The value of 2xy+7.

Expert Solution

Answer to Problem 21A

The value of 2xy+7 is 151.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

2xy+7 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

2xy+7=2(12×6)+7=2×72+7=144+7=151

Thus, the value of 2xy+7 is 151.

Conclusion:

The value of 2xy+7 is 151.

To determine

(b)

The value of 3x−2y+xy.

Expert Solution

Answer to Problem 21A

The value of 3x−2y+xy is 96.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

3x−2y+xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

3x−2y+xy=(3×12)−(2×6)+(12×6)=36−12+72=24+72=96

Thus, the value of 3x−2y+xy is 96.

Conclusion:

The value of 3x−2y+xy is 96.

To determine

(c)

The value of 5xy−2y8x−xy.

Expert Solution

Answer to Problem 21A

The value of 5xy−2y8x−xy is 14.5.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

5xy−2y8x−xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

5xy−2y8x−xy=( 5×12×6)−( 2×6)( 8×12)−( 12×6)=360−1296−72=34824=14.5

Thus, the value of 5xy−2y8x−xy is 14.5.

Conclusion:

The value of 5xy−2y8x−xy is 14.5.

To determine

(d)

The value of 4x−4y3.

Expert Solution

Answer to Problem 21A

The value of 4x−4y3 is 8.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

2xy+7 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

4x−4y3=( 4×12)−( 4×6)3=48−243=243=8

Thus, the value of 4x−4y3 is 8.

Conclusion:

The value of 4x−4y3 is 8.

To determine

(e)

The value of 6x−3y+xy.

Expert Solution

Answer to Problem 21A

The value of 6x−3y+xy is 126.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

6x−3y+xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

6x−3y+xy=(6×12)−(3×6)+(12×6)=72−18+72=144−18=126

Thus, the value of 6x−3y+xy is 126.

Conclusion:

The value of 6x−3y+xy is 126.

To determine

(f)

The value of x2−y2.

Expert Solution

Answer to Problem 21A

The value of x2−y2 is 108.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

x2−y2 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

x2−y2=122−62=(12×12)−(6×6)=144−36=108

Thus, the value of x2−y2 is 108.

Conclusion:

The value of x2−y2 is 108.

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Subject— Applied mathematics

Answer 2

Question

Chapter 39, Problem 21A

To determine

(a)

The value of 2xy+7.

Expert Solution

Answer to Problem 21A

The value of 2xy+7 is 151.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

2xy+7 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

2xy+7=2(12×6)+7=2×72+7=144+7=151

Thus, the value of 2xy+7 is 151.

Conclusion:

The value of 2xy+7 is 151.

To determine

(b)

The value of 3x−2y+xy.

Expert Solution

Answer to Problem 21A

The value of 3x−2y+xy is 96.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

3x−2y+xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

3x−2y+xy=(3×12)−(2×6)+(12×6)=36−12+72=24+72=96

Thus, the value of 3x−2y+xy is 96.

Conclusion:

The value of 3x−2y+xy is 96.

To determine

(c)

The value of 5xy−2y8x−xy.

Expert Solution

Answer to Problem 21A

The value of 5xy−2y8x−xy is 14.5.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

5xy−2y8x−xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

5xy−2y8x−xy=( 5×12×6)−( 2×6)( 8×12)−( 12×6)=360−1296−72=34824=14.5

Thus, the value of 5xy−2y8x−xy is 14.5.

Conclusion:

The value of 5xy−2y8x−xy is 14.5.

To determine

(d)

The value of 4x−4y3.

Expert Solution

Answer to Problem 21A

The value of 4x−4y3 is 8.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

2xy+7 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

4x−4y3=( 4×12)−( 4×6)3=48−243=243=8

Thus, the value of 4x−4y3 is 8.

Conclusion:

The value of 4x−4y3 is 8.

To determine

(e)

The value of 6x−3y+xy.

Expert Solution

Answer to Problem 21A

The value of 6x−3y+xy is 126.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

6x−3y+xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

6x−3y+xy=(6×12)−(3×6)+(12×6)=72−18+72=144−18=126

Thus, the value of 6x−3y+xy is 126.

Conclusion:

The value of 6x−3y+xy is 126.

To determine

(f)

The value of x2−y2.

Expert Solution

Answer to Problem 21A

The value of x2−y2 is 108.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

x2−y2 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

x2−y2=122−62=(12×12)−(6×6)=144−36=108

Thus, the value of x2−y2 is 108.

Conclusion:

The value of x2−y2 is 108.

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Answer 3

Question

Chapter 39, Problem 21A

To determine

(a)

The value of 2xy+7.

Expert Solution

Answer to Problem 21A

The value of 2xy+7 is 151.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

2xy+7 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

2xy+7=2(12×6)+7=2×72+7=144+7=151

Thus, the value of 2xy+7 is 151.

Conclusion:

The value of 2xy+7 is 151.

To determine

(b)

The value of 3x−2y+xy.

Expert Solution

Answer to Problem 21A

The value of 3x−2y+xy is 96.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

3x−2y+xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

3x−2y+xy=(3×12)−(2×6)+(12×6)=36−12+72=24+72=96

Thus, the value of 3x−2y+xy is 96.

Conclusion:

The value of 3x−2y+xy is 96.

To determine

(c)

The value of 5xy−2y8x−xy.

Expert Solution

Answer to Problem 21A

The value of 5xy−2y8x−xy is 14.5.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

5xy−2y8x−xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

5xy−2y8x−xy=( 5×12×6)−( 2×6)( 8×12)−( 12×6)=360−1296−72=34824=14.5

Thus, the value of 5xy−2y8x−xy is 14.5.

Conclusion:

The value of 5xy−2y8x−xy is 14.5.

To determine

(d)

The value of 4x−4y3.

Expert Solution

Answer to Problem 21A

The value of 4x−4y3 is 8.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

2xy+7 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

4x−4y3=( 4×12)−( 4×6)3=48−243=243=8

Thus, the value of 4x−4y3 is 8.

Conclusion:

The value of 4x−4y3 is 8.

To determine

(e)

The value of 6x−3y+xy.

Expert Solution

Answer to Problem 21A

The value of 6x−3y+xy is 126.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

6x−3y+xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

6x−3y+xy=(6×12)−(3×6)+(12×6)=72−18+72=144−18=126

Thus, the value of 6x−3y+xy is 126.

Conclusion:

The value of 6x−3y+xy is 126.

To determine

(f)

The value of x2−y2.

Expert Solution

Answer to Problem 21A

The value of x2−y2 is 108.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

x2−y2 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

x2−y2=122−62=(12×12)−(6×6)=144−36=108

Thus, the value of x2−y2 is 108.

Conclusion:

The value of x2−y2 is 108.

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Answer 4

Question

Chapter 39, Problem 21A

To determine

(a)

The value of 2xy+7.

Expert Solution

Answer to Problem 21A

The value of 2xy+7 is 151.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

2xy+7 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

2xy+7=2(12×6)+7=2×72+7=144+7=151

Thus, the value of 2xy+7 is 151.

Conclusion:

The value of 2xy+7 is 151.

To determine

(b)

The value of 3x−2y+xy.

Expert Solution

Answer to Problem 21A

The value of 3x−2y+xy is 96.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

3x−2y+xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

3x−2y+xy=(3×12)−(2×6)+(12×6)=36−12+72=24+72=96

Thus, the value of 3x−2y+xy is 96.

Conclusion:

The value of 3x−2y+xy is 96.

To determine

(c)

The value of 5xy−2y8x−xy.

Expert Solution

Answer to Problem 21A

The value of 5xy−2y8x−xy is 14.5.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

5xy−2y8x−xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

5xy−2y8x−xy=( 5×12×6)−( 2×6)( 8×12)−( 12×6)=360−1296−72=34824=14.5

Thus, the value of 5xy−2y8x−xy is 14.5.

Conclusion:

The value of 5xy−2y8x−xy is 14.5.

To determine

(d)

The value of 4x−4y3.

Expert Solution

Answer to Problem 21A

The value of 4x−4y3 is 8.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

2xy+7 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

4x−4y3=( 4×12)−( 4×6)3=48−243=243=8

Thus, the value of 4x−4y3 is 8.

Conclusion:

The value of 4x−4y3 is 8.

To determine

(e)

The value of 6x−3y+xy.

Expert Solution

Answer to Problem 21A

The value of 6x−3y+xy is 126.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

6x−3y+xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

6x−3y+xy=(6×12)−(3×6)+(12×6)=72−18+72=144−18=126

Thus, the value of 6x−3y+xy is 126.

Conclusion:

The value of 6x−3y+xy is 126.

To determine

(f)

The value of x2−y2.

Expert Solution

Answer to Problem 21A

The value of x2−y2 is 108.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

x2−y2 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

x2−y2=122−62=(12×12)−(6×6)=144−36=108

Thus, the value of x2−y2 is 108.

Conclusion:

The value of x2−y2 is 108.

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Answer 5

Chapter 39, Problem 21A

To determine

(a)

The value of 2xy+7.

Expert Solution

Answer to Problem 21A

The value of 2xy+7 is 151.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

2xy+7 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

2xy+7=2(12×6)+7=2×72+7=144+7=151

Thus, the value of 2xy+7 is 151.

Conclusion:

The value of 2xy+7 is 151.

To determine

(b)

The value of 3x−2y+xy.

Expert Solution

Answer to Problem 21A

The value of 3x−2y+xy is 96.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

3x−2y+xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

3x−2y+xy=(3×12)−(2×6)+(12×6)=36−12+72=24+72=96

Thus, the value of 3x−2y+xy is 96.

Conclusion:

The value of 3x−2y+xy is 96.

To determine

(c)

The value of 5xy−2y8x−xy.

Expert Solution

Answer to Problem 21A

The value of 5xy−2y8x−xy is 14.5.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

5xy−2y8x−xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

5xy−2y8x−xy=( 5×12×6)−( 2×6)( 8×12)−( 12×6)=360−1296−72=34824=14.5

Thus, the value of 5xy−2y8x−xy is 14.5.

Conclusion:

The value of 5xy−2y8x−xy is 14.5.

To determine

(d)

The value of 4x−4y3.

Expert Solution

Answer to Problem 21A

The value of 4x−4y3 is 8.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

2xy+7 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

4x−4y3=( 4×12)−( 4×6)3=48−243=243=8

Thus, the value of 4x−4y3 is 8.

Conclusion:

The value of 4x−4y3 is 8.

To determine

(e)

The value of 6x−3y+xy.

Expert Solution

Answer to Problem 21A

The value of 6x−3y+xy is 126.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

6x−3y+xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

6x−3y+xy=(6×12)−(3×6)+(12×6)=72−18+72=144−18=126

Thus, the value of 6x−3y+xy is 126.

Conclusion:

The value of 6x−3y+xy is 126.

To determine

(f)

The value of x2−y2.

Expert Solution

Answer to Problem 21A

The value of x2−y2 is 108.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

x2−y2 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

x2−y2=122−62=(12×12)−(6×6)=144−36=108

Thus, the value of x2−y2 is 108.

Conclusion:

The value of x2−y2 is 108.

Answer 6

Chapter 39, Problem 21A

To determine

(a)

The value of 2xy+7.

Expert Solution

Answer to Problem 21A

The value of 2xy+7 is 151.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

2xy+7 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

2xy+7=2(12×6)+7=2×72+7=144+7=151

Thus, the value of 2xy+7 is 151.

Conclusion:

The value of 2xy+7 is 151.

Answer 7

Chapter 39, Problem 21A

To determine

(a)

The value of 2xy+7.

Answer 8

Expert Solution

Answer to Problem 21A

The value of 2xy+7 is 151.

Answer 9

Expert Solution

Answer 10

Expert Solution

Answer 11

Expert Solution

Answer 12

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

2xy+7 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

2xy+7=2(12×6)+7=2×72+7=144+7=151

Thus, the value of 2xy+7 is 151.

Conclusion:

The value of 2xy+7 is 151.

Answer 13

To determine

(b)

The value of 3x−2y+xy.

Expert Solution

Answer to Problem 21A

The value of 3x−2y+xy is 96.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

3x−2y+xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

3x−2y+xy=(3×12)−(2×6)+(12×6)=36−12+72=24+72=96

Thus, the value of 3x−2y+xy is 96.

Conclusion:

The value of 3x−2y+xy is 96.

Answer 14

To determine

(b)

The value of 3x−2y+xy.

Answer 15

Expert Solution

Answer to Problem 21A

The value of 3x−2y+xy is 96.

Answer 16

Expert Solution

Answer 17

Expert Solution

Answer 18

Expert Solution

Answer 19

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

3x−2y+xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

3x−2y+xy=(3×12)−(2×6)+(12×6)=36−12+72=24+72=96

Thus, the value of 3x−2y+xy is 96.

Conclusion:

The value of 3x−2y+xy is 96.

Answer 20

To determine

(c)

The value of 5xy−2y8x−xy.

Expert Solution

Answer to Problem 21A

The value of 5xy−2y8x−xy is 14.5.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

5xy−2y8x−xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

5xy−2y8x−xy=( 5×12×6)−( 2×6)( 8×12)−( 12×6)=360−1296−72=34824=14.5

Thus, the value of 5xy−2y8x−xy is 14.5.

Conclusion:

The value of 5xy−2y8x−xy is 14.5.

Answer 21

To determine

(c)

The value of 5xy−2y8x−xy.

Answer 22

Expert Solution

Answer to Problem 21A

The value of 5xy−2y8x−xy is 14.5.

Answer 23

Expert Solution

Answer 24

Expert Solution

Answer 25

Expert Solution

Answer 26

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

5xy−2y8x−xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

5xy−2y8x−xy=( 5×12×6)−( 2×6)( 8×12)−( 12×6)=360−1296−72=34824=14.5

Thus, the value of 5xy−2y8x−xy is 14.5.

Conclusion:

The value of 5xy−2y8x−xy is 14.5.

Answer 27

To determine

(d)

The value of 4x−4y3.

Expert Solution

Answer to Problem 21A

The value of 4x−4y3 is 8.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

2xy+7 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

4x−4y3=( 4×12)−( 4×6)3=48−243=243=8

Thus, the value of 4x−4y3 is 8.

Conclusion:

The value of 4x−4y3 is 8.

Answer 28

To determine

(d)

The value of 4x−4y3.

Answer 29

Expert Solution

Answer to Problem 21A

The value of 4x−4y3 is 8.

Answer 30

Expert Solution

Answer 31

Expert Solution

Answer 32

Expert Solution

Answer 33

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

2xy+7 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

4x−4y3=( 4×12)−( 4×6)3=48−243=243=8

Thus, the value of 4x−4y3 is 8.

Conclusion:

The value of 4x−4y3 is 8.

Answer 34

To determine

(e)

The value of 6x−3y+xy.

Expert Solution

Answer to Problem 21A

The value of 6x−3y+xy is 126.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

6x−3y+xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

6x−3y+xy=(6×12)−(3×6)+(12×6)=72−18+72=144−18=126

Thus, the value of 6x−3y+xy is 126.

Conclusion:

The value of 6x−3y+xy is 126.

Answer 35

To determine

(e)

The value of 6x−3y+xy.

Answer 36

Expert Solution

Answer to Problem 21A

The value of 6x−3y+xy is 126.

Answer 37

Expert Solution

Answer 38

Expert Solution

Answer 39

Expert Solution

Answer 40

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

6x−3y+xy ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

6x−3y+xy=(6×12)−(3×6)+(12×6)=72−18+72=144−18=126

Thus, the value of 6x−3y+xy is 126.

Conclusion:

The value of 6x−3y+xy is 126.

Answer 41

To determine

(f)

The value of x2−y2.

Expert Solution

Answer to Problem 21A

The value of x2−y2 is 108.

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

x2−y2 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

x2−y2=122−62=(12×12)−(6×6)=144−36=108

Thus, the value of x2−y2 is 108.

Conclusion:

The value of x2−y2 is 108.

Answer 42

To determine

(f)

The value of x2−y2.

Answer 43

Expert Solution

Answer to Problem 21A

The value of x2−y2 is 108.

Answer 44

Expert Solution

Answer 45

Expert Solution

Answer 46

Expert Solution

Answer 47

Explanation of Solution

Given:

The value of x is 12 and y is 6.

Calculation:

The algebraic expression is given below:

x2−y2 ... (1)

Substitute 12 for x and 6 for y in equation (1) as follows:

x2−y2=122−62=(12×12)−(6×6)=144−36=108

Thus, the value of x2−y2 is 108.

Conclusion:

The value of x2−y2 is 108.

Answer 48

Ch. 39 - Use the Table of BlockThicknesses of a Customary...Ch. 39 - Use a digital micrometer to measure the length and...Ch. 39 - Read the setting of the metric micrometer scale in...Ch. 39 - Use an electronic vernier caliper to measure the...Ch. 39 - Prob. 5A Ch. 39 - 43 is 62% of what number? Round the answer to 2...Ch. 39 - Express each of the following problems as an...Ch. 39 - Express each of the following problems as an...Ch. 39 - Express each of the following problems as an...Ch. 39 - Express each of the following problems as an...

(a) The value of 2 x y + 7 .

Concept explainers

Videos

(a)

The value of 2xy+7.

Answer to Problem 21A

Explanation of Solution

(b)

The value of 3x−2y+xy.

Answer to Problem 21A

Explanation of Solution

(c)

The value of 5xy−2y8x−xy.

Answer to Problem 21A

Explanation of Solution

(d)

The value of 4x−4y3.

Answer to Problem 21A

Explanation of Solution

(e)

The value of 6x−3y+xy.

Answer to Problem 21A

Explanation of Solution

(f)

The value of x2−y2.

Answer to Problem 21A

Explanation of Solution

Want to see more full solutions like this?

Chapter 39 Solutions

(a) The value of 2 x y + 7 .

Concept explainers

Videos

(a) The value of 2xy+7.

Answer to Problem 21A

Explanation of Solution

(b) The value of 3x−2y+xy.

Answer to Problem 21A

Explanation of Solution

(c) The value of 5xy−2y8x−xy.

Answer to Problem 21A

Explanation of Solution

(d) The value of 4x−4y3.

Answer to Problem 21A

Explanation of Solution

(e) The value of 6x−3y+xy.

Answer to Problem 21A

Explanation of Solution

(f) The value of x2−y2.

Answer to Problem 21A

Explanation of Solution

Want to see more full solutions like this?

Chapter 39 Solutions

(a)

The value of 2xy+7.

(b)

The value of 3x−2y+xy.

(c)

The value of 5xy−2y8x−xy.

(d)

The value of 4x−4y3.

(e)

The value of 6x−3y+xy.

(f)

The value of x2−y2.