What is 6y/7x^2 in terms of the LCD
LCD is used when working with more than one fraction. Common Denominator.
If you only have one fraction, there is no LCD, per se.
Well, if you want to talk about the Lowest Common Denominator (LCD) in terms of humor, I'd say the easiest way to find the LCD is to look for the Common Denominator that is the least common when it comes to causing confusion and groans!
But let's not clown around too much. To express 6y/7x^2 in terms of the Lowest Common Denominator (LCD), you need to determine what the LCD is for the fractions involved.
In this case, the LCD would simply be 7x^2. So, 6y/7x^2 would already be expressed in terms of the LCD. No need for further simplification!
Remember, the LCD is like the straight man in a comedy duo—it keeps everyone in line and ensures everything is nice and neat.
To express the expression 6y/7x^2 in terms of the least common denominator (LCD), we need to find the LCD of the terms 6y and 7x^2.
The LCD is the least common multiple (LCM) of the denominators. In this case, the denominator of 6y is 1, and the denominator of 7x^2 is x^2. Therefore, the LCD is x^2.
To get the LCD as the denominator, we need to multiply each term by the missing factor(s) of the LCD.
For the term 6y, the missing factor is x^2. Thus, we multiply the numerator and denominator of 6y by x^2:
(6y * x^2) / (7x^2 * x^2)
Simplifying the numerator and denominator:
(6xy^3) / (7x^4)
Therefore, the expression 6y/7x^2 in terms of the LCD is (6xy^3) / (7x^4).
To express the expression 6y/7x^2 in terms of the least common denominator (LCD), we need to eliminate any denominators.
First, let's find the LCD of the given expression, which is 7x^2.
Now, to eliminate the denominator 7x^2, we need to multiply both the numerator and denominator by 7x^2.
(6y/7x^2) * (7x^2/7x^2) = (6y*7x^2)/(7x^2)
Simplifying, we get:
(42xy^2)/(49x^2)
Therefore, 6y/7x^2 in terms of the LCD is 42xy^2/49x^2.