Question
Add the rational expressions to find the sum: x2−23x−2+x+53x−2 .(1 point)Responsesx3+33x−2Start Fraction x cubed plus 3 over 3 x minus 2 End Fractionx2+x+33x−2Start Fraction x squared plus x plus 3 over 3 x minus 2 End Fractionx2+x+73x−2Start Fraction x squared plus x plus 7 over 3 x minus 2 End Fractionx2+x+36x−4
Answers
Answered by
GPT-4o mini
To add the rational expressions \( \frac{x^2-23x-2}{x+5} + \frac{3x-2}{3} \), we first need a common denominator.
### Step 1: Factor where possible
Let's see if we can factor \( x^2 - 23x - 2 \):
The expression \( x^2 - 23x - 2 \) does not factor nicely, so we'll leave it as is.
Next, let's express the second term:
\[
\frac{3x-2}{3} = \frac{3x-2}{3}
\]
### Step 2: Find a common denominator
The common denominator between \( x + 5 \) and \( 3 \) is \( (x + 5)(3) \).
### Step 3: Rewriting each expression with the common denominator
Now, we can rewrite each expression as follows:
1. First term:
\[
\frac{x^2 - 23x - 2}{x + 5} = \frac{(x^2 - 23x - 2) \cdot 3}{(x + 5) \cdot 3} = \frac{3(x^2 - 23x - 2)}{3(x + 5)}
\]
2. Second term:
\[
\frac{3x - 2}{3} = \frac{(3x - 2)(x + 5)}{3(x + 5)}
\]
### Step 4: Combine the expressions
Now, we can add the two fractions:
\[
\frac{3(x^2 - 23x - 2) + (3x - 2)(x + 5)}{3(x + 5)}
\]
### Step 5: Expand the numerator
1. Expand \( 3(x^2 - 23x - 2) \):
\[
3x^2 - 69x - 6
\]
2. Now expand \( (3x - 2)(x + 5) \):
\[
3x^2 + 15x - 2x - 10 = 3x^2 + 13x - 10
\]
### Step 6: Combine both expansions
Now combine them:
\[
3x^2 - 69x - 6 + 3x^2 + 13x - 10 = 6x^2 - 56x - 16
\]
### Step 7: Final expression
So we have:
\[
\frac{6x^2 - 56x - 16}{3(x + 5)}
\]
Now simplifying the numerator \( 6x^2 - 56x - 16 \) gives:
Factor out 2:
\[
= \frac{2(3x^2 - 28x - 8)}{3(x + 5)}
\]
### Conclusion
Since none of the answers provided in the original question match with this final expression, please verify the inputs of the problem or share the options again.
### Step 1: Factor where possible
Let's see if we can factor \( x^2 - 23x - 2 \):
The expression \( x^2 - 23x - 2 \) does not factor nicely, so we'll leave it as is.
Next, let's express the second term:
\[
\frac{3x-2}{3} = \frac{3x-2}{3}
\]
### Step 2: Find a common denominator
The common denominator between \( x + 5 \) and \( 3 \) is \( (x + 5)(3) \).
### Step 3: Rewriting each expression with the common denominator
Now, we can rewrite each expression as follows:
1. First term:
\[
\frac{x^2 - 23x - 2}{x + 5} = \frac{(x^2 - 23x - 2) \cdot 3}{(x + 5) \cdot 3} = \frac{3(x^2 - 23x - 2)}{3(x + 5)}
\]
2. Second term:
\[
\frac{3x - 2}{3} = \frac{(3x - 2)(x + 5)}{3(x + 5)}
\]
### Step 4: Combine the expressions
Now, we can add the two fractions:
\[
\frac{3(x^2 - 23x - 2) + (3x - 2)(x + 5)}{3(x + 5)}
\]
### Step 5: Expand the numerator
1. Expand \( 3(x^2 - 23x - 2) \):
\[
3x^2 - 69x - 6
\]
2. Now expand \( (3x - 2)(x + 5) \):
\[
3x^2 + 15x - 2x - 10 = 3x^2 + 13x - 10
\]
### Step 6: Combine both expansions
Now combine them:
\[
3x^2 - 69x - 6 + 3x^2 + 13x - 10 = 6x^2 - 56x - 16
\]
### Step 7: Final expression
So we have:
\[
\frac{6x^2 - 56x - 16}{3(x + 5)}
\]
Now simplifying the numerator \( 6x^2 - 56x - 16 \) gives:
Factor out 2:
\[
= \frac{2(3x^2 - 28x - 8)}{3(x + 5)}
\]
### Conclusion
Since none of the answers provided in the original question match with this final expression, please verify the inputs of the problem or share the options again.