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The ratio of successive terms in the Fibonacci sequence approaches the Golden ratio as the number of terms increases.
the numbers in a ratio called TERMS
In order to reduce fractions to their lowest terms
Write in lowest terms
Let's say your ratio is 1/2 to 3. You would have to multiply both terms in order to get a ratio. For this example, you would need to multiply both terms by 2, making the ratio 1:6. If both of the terms were fractions, say 1/4 and 3/5, you would need to multiply them by the Least Common Multiple, which is 20 in this case. This makes the answer 5:12. Hope I could help you, good luck!
The ratio of different atoms in a compound important because the compound has to achieve an equilibrium in terms of electrical charge. The net total of charges of the atoms forming a compound must be zero.
The ratio of successive terms in the Fibonacci sequence approaches the Golden ratio as the number of terms increases.
the numbers in a ratio called TERMS
The 'golden ratio' is the limit of the ratio of two consecutive terms of the Fibonacci series, as the series becomes very long. Actually, the series converges very quickly ... after only 10 terms, the ratio of consecutive terms is already within 0.03% of the golden ratio.
Ratio
33.3% as a ratio in lowest terms would be 1:3
In order to reduce fractions to their lowest terms
Write in lowest terms
174 over 203 as a ratio in lowest terms is 174 to 203 or 174:203.
Let's say your ratio is 1/2 to 3. You would have to multiply both terms in order to get a ratio. For this example, you would need to multiply both terms by 2, making the ratio 1:6. If both of the terms were fractions, say 1/4 and 3/5, you would need to multiply them by the Least Common Multiple, which is 20 in this case. This makes the answer 5:12. Hope I could help you, good luck!
5 to 4 is in its lowest terms.
its simplest form.