As many as you like.
The expression that represents the ratio of b to c is written as ( \frac{b}{c} ). This fraction indicates how many times the value of c fits into the value of b. If you want to express it as a ratio, it can also be written as ( b:c ).
The answer depends on what is wrong with it.
3
There are infinitely many of them. Any ratio of the form (2*k)/k where k is a non-zero integerwould be one such fraction.
It goes 189/24 times: a fraction which can be simplified, if required.
You can ride a ratio as a percent hundred times because percentage goes up to 100.
No, that statement is not accurate. A ratio is a comparison of two quantities by division, expressing how many times one quantity contains another. It can be represented as a fraction or with a colon (e.g., 3:1). Multiplication is not a defining characteristic of ratios.
A comparison of two numbers expresses the relationship between them in terms of their ratio. This can be represented as a fraction, such as ( \frac{a}{b} ), or using a colon, like ( a:b ). Both forms indicate how many times one number contains or is contained by the other, providing a clear way to understand their relative sizes. For example, if comparing 4 and 2, the comparison can be shown as ( \frac{4}{2} ) or ( 4:2 ), both of which simplify to the ratio of 2:1.
The fraction of females is 5/6.
20 goes in to 135 two times with a remainder of 15. Written as a fraction, that is 2 15/20. In simplest form, it is 2 3/4.
1 and 28/120 times
25/3 times