Simplify 4x + 8x using the properties of operations.
@Mozart is a menace and the bot is right on the second to last one lol
Its 5/7x
Using the properties of operations, we can simplify 4x + 8x by adding the coefficients of the x terms.
4x + 8x = (4 + 8)x = 12x
So, the simplified form of 4x + 8x is 12x.
Simplify 9g−7h−6g + 2h
Using the properties of operations, we can simplify 9g - 7h - 6g + 2h by combining like terms.
The like terms in this expression are the terms with the same variable(s) raised to the same power(s), which in this case are the terms with g and h.
Combining the terms with g, we have:
9g - 6g = (9 - 6)g = 3g
Combining the terms with h, we have:
-7h + 2h = (-7 + 2)h = -5h
So, the simplified form of 9g - 7h - 6g + 2h is 3g - 5h.
Simplify 2a − 4b +7 + 8a + 6b − 2.
Using the properties of operations, we can simplify 2a - 4b + 7 + 8a + 6b - 2 by combining like terms.
Combining the terms with "a", we have:
2a + 8a = 10a
Combining the terms with "b", we have:
-4b + 6b = 2b
Combining the constant terms, we have:
7 - 2 = 5
So, the simplified form of 2a - 4b + 7 + 8a + 6b - 2 is 10a + 2b + 5.
Simplify 3/7x + 2/7x using properties of operations.
To simplify 3/7x + 2/7x, we combine the two terms with common denominators. In this case, the terms have a common denominator of 7x.
3/7x + 2/7x = (3 + 2)/(7x) = 5/7x
Therefore, the simplified form of 3/7x + 2/7x is 5/7x.
Simplify 6/7c − 5/9d − 1/2 c + 1/3
To simplify 6/7c - 5/9d - 1/2c + 1/3, we need to combine the terms that have the same variable.
First, let's combine the terms with c:
6/7c - 1/2c = (12/14c - 7/14c) = 5/14c
Next, let's combine the terms with d:
-5/9d = -5/9d
Finally, let's combine the constant terms:
1/3
Putting it all together, the simplified form of 6/7c - 5/9d - 1/2c + 1/3 is 5/14c - 5/9d + 1/3.