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4. [tex]20abc(a + b - c) =[/tex]

5. [tex](x + y) \cdot (x^2 + y^2)[/tex]

6. [tex](2a + b) \cdot (3a - 2b)[/tex]

7. [tex](6a - 5b) \cdot (2b + 7a)[/tex]

8. [tex](4x + y)(-2x - 5xy)[/tex]

Sagot :

GinnyAnsweridn
Let's solve each equation one-by-one step-by-step.

### Problem 4: [tex]\(20abc(a + b - c)\)[/tex]

To solve this problem, we distribute each term inside the parenthesis by [tex]\(20abc\)[/tex]:

[tex]\[ 20abc(a + b - c) = 20abc \cdot a + 20abc \cdot b - 20abc \cdot c \][/tex]

So the solution is:

[tex]\[ 20a^2bc + 20ab^2c - 20abc^2 \][/tex]

### Problem 5: [tex]\((x + y) \cdot (x^2 + y^2)\)[/tex]

To solve this problem, we distribute each term inside the parenthesis by [tex]\((x + y)\)[/tex]:

[tex]\[ (x + y) \cdot (x^2 + y^2) = x \cdot x^2 + x \cdot y^2 + y \cdot x^2 + y \cdot y^2 \][/tex]

So the solution is:

[tex]\[ x^3 + xy^2 + yx^2 + y^3 \][/tex]

### Problem 6: [tex]\((2a + b) \cdot (3a - 2b)\)[/tex]

To solve this problem, we distribute each term inside the parenthesis using the distributive property:

[tex]\[ (2a + b) \cdot (3a - 2b) = 2a \cdot 3a + 2a \cdot (-2b) + b \cdot 3a + b \cdot (-2b) \][/tex]

Solving it step-by-step:

[tex]\[ = 6a^2 - 4ab + 3ab - 2b^2 \][/tex]

Combining like-terms, we get:

[tex]\[ = 6a^2 - ab - 2b^2 \][/tex]

### Problem 7: [tex]\((6a - 5b) \cdot (2b + 7a)\)[/tex]

To solve this problem, we distribute each term inside the parenthesis using the distributive property:

[tex]\[ (6a - 5b) \cdot (2b + 7a) = 6a \cdot 2b + 6a \cdot 7a - 5b \cdot 2b - 5b \cdot 7a \][/tex]

Solving it step-by-step:

[tex]\[ = 12ab + 42a^2 - 10b^2 - 35ab \][/tex]

Combining like-terms, we get:

[tex]\[ = 42a^2 - 23ab - 10b^2 \][/tex]

Substituting [tex]\(a = 4\)[/tex] and [tex]\(b = 6\)[/tex]:

[tex]\[ = 42(4)^2 - 23(4)(6) - 10(6)^2 \][/tex]

Calculating each term:

[tex]\[ = 42 \cdot 16 - 23 \cdot 24 - 10 \cdot 36 \][/tex]

[tex]\[ = 672 - 552 - 360 \][/tex]

[tex]\[ = -240 \][/tex]

### Problem 8: [tex]\((4x + y) \cdot (-2x - 5xy)\)[/tex]

To solve this problem, we distribute each term inside the parenthesis using the distributive property:

[tex]\[ (4x + y) \cdot (-2x - 5xy) = 4x \cdot (-2x) + 4x \cdot (-5xy) + y \cdot (-2x) + y \cdot (-5xy) \][/tex]

Solving it step-by-step:

[tex]\[ = -8x^2 - 20x^2y - 2xy - 5xy^2 \][/tex]

Combining like-terms, we get:

[tex]\[ = -8x^2 - 20x^2y - 2xy - 5xy^2 \][/tex]

And that completes the detailed, step-by-step solutions for each problem.
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