(x—h)²—(x—h)² solve
The expression (x—h)²—(x—h)² can be rewritten as 0.
Therefore, the solution is 0.
To solve the expression (x—h)²—(x—h)², we can simplify it step by step.
Step 1: Distribute the exponent of ² to each term inside the brackets.
(x—h)² = (x—h) * (x—h)
(x—h)² = x * x + x * -h + -h * x + -h * -h
(x—h)² = x² - 2hx + h²
Step 2: Substitute the simplified expression back into the original expression.
(x—h)²—(x—h)² = (x² - 2hx + h²) — (x² - 2hx + h²)
Step 3: Simplify the expression by combining like terms.
(x² - 2hx + h²) — (x² - 2hx + h²) = x² - 2hx + h² - x² + 2hx - h²
Step 4: Notice that the x², -2hx, and h² terms cancel each other out.
x² - 2hx + h² - x² + 2hx - h² = 0
Step 5: The result is 0. Therefore, (x—h)²—(x—h)² equals 0.