Subtract
(h + k) - (2k -h)
(h + k) - (2k - h) can be rewritten as h + k - 2k + h.
Next, we can combine like terms by adding the h terms and the k terms separately.
To combine the h terms, we have h + h = 2h.
To combine the k terms, we have k - 2k = -k.
Putting it together, the final answer is 2h - k.
To subtract (h + k) - (2k - h), we need to distribute the negative sign to each term inside the second parentheses.
First, let's distribute the negative sign to 2k and -h:
(h + k) - 2k + h
Next, we can combine like terms, which means combining all the terms involving the same variable:
(h + h) + (k - 2k)
Simplifying further:
2h + (k - 2k)
Now, let's combine the k and -2k terms:
2h - k
Therefore, the subtraction (h + k) - (2k - h) simplifies to 2h - k.
To subtract the given expression, (h + k) - (2k - h), we need to distribute the negative sign to the terms within the second parentheses. This can be done by changing the sign of each term inside the parentheses.
(h + k) - (2k - h)
= (h + k) - 2k + h
Now, we can combine like terms by adding or subtracting similar terms.
= h + k - 2k + h
Next, we group the like terms together:
= (h + h) + (k - 2k)
= 2h + (-k)
Finally, we can simplify the expression:
= 2h - k
Therefore, the subtracted expression (h + k) - (2k - h) simplifies to 2h - k.