Simplify 9/10 X +1/6y +3/10 X +3/6Y
Be sure to reduce any fractions to the lowest terms
What is the absolute correct answer?
The given expression is:
(9/10)x + (1/6)y + (3/10)x + (3/6)y
Simplifying this expression, we combine like terms:
[(9/10)x + (3/10)x] + [(1/6)y + (3/6)y]
[(9/10 + 3/10)x] + [(1/6 + 3/6)y]
(12/10)x + (4/6)y
Reducing the fractions to the lowest terms, we have:
(6/5)x + (2/3)y
Therefore, the simplified expression is (6/5)x + (2/3)y.
To simplify 9/10 X + 1/6y + 3/10 X + 3/6Y, we can combine like terms.
First, let's combine the terms with "X":
9/10 X + 3/10 X = (9/10 + 3/10) X = 12/10 X
Next, let's combine the terms with "Y":
1/6y + 3/6Y = (1/6 + 3/6) Y = 4/6 Y
Now, we have 12/10 X + 4/6 Y.
To put these fractions in the lowest terms, we can simplify them:
12/10 = 6/5 (dividing the numerator and denominator by 2)
4/6 = 2/3 (dividing the numerator and denominator by 2)
Therefore, the simplified expression is 6/5 X + 2/3 Y.
To simplify the expression (9/10)x + (1/6)y + (3/10)x + (3/6)y and reduce any fractions to the lowest terms, we combine and rearrange like terms.
First, let's focus on the terms with x.
(9/10)x + (3/10)x can be added together since they have the same variable, x. Combining the coefficients, we get:
(9/10)x + (3/10)x = (9/10 + 3/10)x = (12/10)x = (6/5)x
Next, let's focus on the terms with y.
(1/6)y + (3/6)y can be added together since they have the same variable, y. Combining the coefficients, we get:
(1/6)y + (3/6)y = (1/6 + 3/6)y = (4/6)y = (2/3)y
Now, we can put the simplified terms together:
(6/5)x + (2/3)y
Therefore, the simplified expression, with fractions reduced to the lowest terms, is:
(6/5)x + (2/3)y
Note that the absolute correct answer may vary based on the instructions or context of the problem. This answer is simplified and reduced to the lowest terms, which is usually the desired form for expressions.