A^2+c^2/(a-c)-2ac/(a-c)

The expression you provided is:

A^2 + c^2/(a-c) - 2ac/(a-c)

To simplify it, we'll start by finding a common denominator for the last two terms, (a - c). Then, we can combine the fractions and simplify further.

Step 1: Find a common denominator (a - c): Multiply the first term, c^2/(a - c), by (a - c)/(a - c) to get a common denominator:

A^2 + (c^2 * (a - c))/(a - c) - 2ac/(a - c)

Step 2: Combine the fractions: Now that we have a common denominator, we can combine the fractions over (a - c):

A^2 + (c^2 * (a - c) - 2ac)/(a - c)

Step 3: Simplify the numerator: Simplify the numerator by expanding c^2 * (a - c) and combining like terms:

A^2 + (c^3 - c^2a - 2ac)/(a - c)

Step 4: Factor out common terms: Factor out -c from the numerator:

A^2 + (-c(a + c^2 - 2a))/(a - c)

Step 5: Simplify further if needed: If there are any common factors between the terms in the numerator and denominator, you can simplify the expression further. However, without specific values for A, a, and c, it is not possible to simplify the expression any further.

So, the simplified form of the expression is:

A^2 + (-c(a + c^2 - 2a))/(a - c)

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