Simplify the fraction x675\x453
To simplify the fraction \( \frac{x675}{x453} \), we look for a common factor between the numerator and the denominator.
Both \(675\) and \(453\) are divisible by \(3\), so we can divide the numerator and the denominator by \(3\):
\[\frac{x675}{x453} = \frac{225x}{151x}\]
Now we can simplify by dividing \(225\) by \(151\):
\[\frac{x675}{x453} = \frac{225x}{151x} = \frac{15}{x}\]
Therefore, the simplified fraction is \( \frac{15}{x} \).
what?
Apologies for the mistake in my previous response. Let's simplify the fraction \( \frac{x675}{x453} \).
We can cancel out the common factor \(x\) in the numerator and denominator:
\[ \frac{x675}{x453} = \frac{675}{453} \]
Now we need to simplify the numerator and denominator further. Both \(675\) and \(453\) are divisible by \(3\), so we can divide them both by \(3\):
\[ \frac{x675}{x453} = \frac{675}{453} = \frac{225}{151} \]
Therefore, the simplified fraction is \( \frac{225}{151} \).
what does \( \frac{225}{151} \) mean?
\( \frac{225}{151} \) is a fraction that represents the division of the number 225 by the number 151. It signifies that if you divide 225 into 151 equal parts, each part would have a value of 1 and there would be a remainder of 74.
In decimal form, \( \frac{225}{151} \) is approximately equal to 1.4868.
does \( \frac{225}{151} \) mean 225\151?
No, \( \frac{225}{151} \) does not mean \( 225 \div 151 \) or 225\151.
The fraction \( \frac{225}{151} \) represents the division of the number 225 by the number 151. It means that when you divide 225 into 151 equal parts, each part will have a value of \( \frac{225}{151} \).
In decimal form, \( \frac{225}{151} \) is approximately equal to 1.4868.