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What is the ratio of 160 210 140?
GCF(160, 210, 140) = 10 so the ratio is 16 : 21 : 14
What numbers are equlivalent to 160 percent?
160 percent is equivalent to the decimal/fractional value of 1.6 or the ratio 8:5.
What is the ratio of 640 and 52?
640/52 = 160/13
How do you find the ratio of 800 and 640?
you would want to find a common denominator -- in this case 160 is the largest common denominator 800/160=5 640/160=4 therefore the ratio would be 5:4 (said "5 to 4")
160 foot rope was cut in 2 the ratio qas 7 to 1 how long is each length?
140 and 20
What is the ratio of 248 to 160?
248/160 = 31/20.
What is the ratio of 160 210 140?
GCF(160, 210, 140) = 10 so the ratio is 16 : 21 : 14
What is the ratio of 160 to 420?
The ratio of 160 to 420 can be simplified by dividing both numbers by their greatest common divisor, which is 20. This simplifies the ratio to 8:21. This means that for every 8 units of 160, there are 21 units of 420.
What numbers are equlivalent to 160 percent?
160 percent is equivalent to the decimal/fractional value of 1.6 or the ratio 8:5.
What ratio is equivalent 16 to 6?
Ah, what a happy little question! To find the equivalent ratio to 16:6, we can simplify it by dividing both numbers by their greatest common factor, which is 2. So, 16 divided by 2 is 8, and 6 divided by 2 is 3. Therefore, the equivalent ratio is 8:3. Remember, there are no mistakes in ratios, just happy little simplifications!
What is the ratio of 640 and 52?
640/52 = 160/13
How do you find the ratio of 800 and 640?
you would want to find a common denominator -- in this case 160 is the largest common denominator 800/160=5 640/160=4 therefore the ratio would be 5:4 (said "5 to 4")
Simplify the ratio 232 to 32 to 160?
29: 4 : 20
The ratio of 8 to 5 equals what percent?
8 to 5 = 160%
What is the ratio of 72 to 45?
72 is 8/5 of 42, or 160% of 45
What is the simplest form 95 to 160 ratio?
95 : 160 = 19 : 32
What will be the first term and the common ratio of geometric progression whose 6th and 9th terms are 160 and 1280 respectively?
To find the first term and common ratio of a geometric progression, we can use the formula for the nth term of a geometric sequence: (a_n = a_1 \times r^{(n-1)}). Given that the 6th term is 160 and the 9th term is 1280, we can set up two equations using these values. From the 6th term, we get (a_1 \times r^5 = 160), and from the 9th term, we get (a_1 \times r^8 = 1280). By dividing the two equations, we can eliminate (a_1) and solve for the common ratio (r).
