To find the second number in an equivalent ratio table where the first number is 10, we can set up the ratios based on the provided values: 312, 416, and 520. The ratios can be simplified to fractions: ( \frac{312}{x} = \frac{10}{y} ). By finding the common factor and scaling down, we find that for the first ratio (312:416), the second number corresponding to 10 is 13.33. Thus, the second number is approximately 13.33.
No, the first integer, 23, is half the second, 46.
for x that makes the first ratio equivalent to the second ratio of x to 14 , 56 to 98
Three equivalent ratios of 1 to 3 are 2 to 6, 4 to 12, and 5 to 15. These ratios maintain the same proportional relationship, meaning that for every 1 unit of the first quantity, there are 3 units of the second quantity. Each ratio can be derived by multiplying both parts of the original ratio by the same number.
To use equivalent ratios to complete a table, first identify the ratio you want to work with. Then, multiply or divide both terms of the ratio by the same number to find equivalent values. For example, if the ratio is 2:3, you can find equivalent ratios like 4:6 (by multiplying both terms by 2) or 6:9 (by multiplying by 3). Fill in the table with these calculated ratios to maintain consistency throughout.
Two ratios such as 8:20 and 6:15 are equivalent when they can be reduced to the same set of numbers through division or multiplication with a common factor. in this case dividing the numbers in the first ratio by 4 and the ones in the second ratio by 3 reduces them both to 2:5. Therefore 8:20 and 6:15 are equivalent ratios.
No, the first integer, 23, is half the second, 46.
Ratios can be expressed as fractions. For example 1:7 can be written 1/7. Just as a fraction can be converted into an equivalent fraction by multiplying (or dividing) both the numerator and denominator by the same number then the same process can be applied to ratios. To compare two ratios then convert either the first or second number of the ratio so that both ratios have the same number. A direct comparison can then be made. EXAMPLE : 3:7 compared to 334 :777 If the figures in the first ratio are multiplied by 111 this makes the second number in both ratios the same. Then 3:7 is equivalent 333:777 which is not equal to 334:777 Equally, The second number in the second ratio could be divided by 111 in which case the comparison would then become 334:777 is equivalent to 3.009:7 which is not 3:7.
for x that makes the first ratio equivalent to the second ratio of x to 14 , 56 to 98
Yes, it is true that the first numbers in two equivalent ratios will always have a common factor. This common factor is known as the scale factor, which is used to create equivalent ratios by multiplying or dividing both parts of the ratio by the same number. This ensures that the ratios maintain the same proportionality.
Three equivalent ratios of 1 to 3 are 2 to 6, 4 to 12, and 5 to 15. These ratios maintain the same proportional relationship, meaning that for every 1 unit of the first quantity, there are 3 units of the second quantity. Each ratio can be derived by multiplying both parts of the original ratio by the same number.
first of all your question doesnt make sense at all!!! but ill tell you this, Equivalent Ratios are ratios whose fraction or ratio are equivalent. now go away kid
Two ratios such as 8:20 and 6:15 are equivalent when they can be reduced to the same set of numbers through division or multiplication with a common factor. in this case dividing the numbers in the first ratio by 4 and the ones in the second ratio by 3 reduces them both to 2:5. Therefore 8:20 and 6:15 are equivalent ratios.
An example of two equivalent ratios is 1:2 and 3:6. Both ratios represent the same relationship; for every 1 unit of one quantity, there are 2 units of another, and for every 3 units of the first quantity, there are 6 units of the second. This shows that both ratios maintain the same proportional relationship, even though the numbers differ.
Treat the ratios as fractions. One way you can compare them is to convert them to decimal (divide the numerator by the denominator, or the first number of the ratio by the second number), then compare. Another way is to find a common denominator, then compare the numerators.
First: "were 2 ratios are equal" is a statement that does not make sense. Second: Even if it did, it is a statement, not a question. So there cannot be an answer.
The two ratios, 16 to 9 and 4 to 3, are not the same number. Dividing the first number in the ratio by the second number in the ratio provides a decimal equivalent value. 16 divided by 9 does not equal 4 divided by 3. 16 to 8 and 4 to 2 however are examples of equivalent ratios. When the first number in the pair is divided by the second number in the pair, the answers are equal. Remember that equivalent ratios describe the proportion of the number of one thing to the number of another thing rather than the things themselves. So, the proportion of 16 birds to 8 birds is the same as the proportion of 4 apples to 2 apples, that is 2 to 1.
The first number is divisible by the second number