(x^(2)-4)/(x+2)+(x-3)/(x+2)
To simplify the expression, we can first combine the numerators over the common denominator:
(x^(2)-4 + x-3)/(x+2)
Next, we can combine like terms in the numerator:
(x^2 + x - 4 - 3)/(x+2)
Simplifying further:
(x^2 + x - 7)/(x+2)
So, (x^(2)-4)/(x+2)+(x-3)/(x+2) simplifies to (x^2 + x - 7)/(x+2)
To simplify the expression (x^(2)-4)/(x+2)+(x-3)/(x+2), we can combine the two fractions since they have the same denominator.
Step 1: Combine the numerators:
(x^(2)-4) + (x-3)
Step 2: Simplify the numerators:
x^(2) - 4 + x - 3
Step 3: Combine like terms:
(x^(2) + x) + (-4 - 3)
Step 4: Simplify further:
x^(2) + x - 7
Therefore, the simplified expression is x^(2) + x - 7.
To simplify the expression (x^(2)-4)/(x+2)+(x-3)/(x+2), we can combine the two fractions with the same denominator.
Step 1: Bring the two fractions together since they have the same denominator:
(x^(2)-4 + x-3)/(x+2)
Step 2: Combine the like terms in the numerator:
(x^(2) + x - 4 - 3)/(x+2)
(x^(2) + x - 7)/(x+2)
And that's the simplified form of the expression.