1. unite similar terms with parenthesis. x=2 y=-3 and z=5 find the value of
ax to the 2nd power-cy+ax-2ax to the 2nd power+ 2cy to the 2nd power-ax-cy to the 2nd power+ ax to the 2nd power+ cy
ax^2 - cy + ax - 2ax^2 +2cy^2 -ax -cy^2 + ax^2 +cy = cy^2
The ax, ax^2 and cy terms cancel each other out, leaving you with cy^2 (c * y squared or c * y to the second power).
cy^2 = c * -3 * -3 = 9c (A negative times a negative is a positive).
I hope this helps. Thanks for asking.
math gams
To find the value of the given expression: ax^2 - cy + ax - 2ax^2 + 2cy^2 - ax - cy^2 + ax^2 + cy, we can start by combining like terms.
Step 1: Grouping like terms
Let's group the terms with the same variables together:
(ax^2 - 2ax^2 + ax^2) + (-cy + ax - ax - cy) + (2cy^2 - cy^2)
Simplifying these groups, we have:
(2ax^2) + (-2cy) + (cy^2)
Step 2: Combining like terms
Now, we can combine the grouped terms:
2ax^2 - 2cy + cy^2
Therefore, the value of the given expression is 2ax^2 - 2cy + cy^2.