Q. What is the ratio of 1 and 1/2 hours to 50 minutes?
You probably recognize that 1 1/2 hours is longer than 50 minutes, and 50 minutes is less than an hour. In fact 1 hour is exactly 60 minutes. Also half an hour is 30 minutes, and 1 1/2 hours is 90 minutes (one and a half hours is what that says). 90/50 = 9/5 = 1 4/5 (nine fifths, or one and four fifths).
Q. What is the ratio of 10 minutes to 1 hour?
Hence, the simplest form of 10 minutes : 1 hour is 1 : 6. Now, find the simplest form of 6 hours : 36 hours. Hence, the simplest form of both the ratios are same. This means that the ratios 10 min : 1 hour and 6 hours : 36 hours are in proportion.
Table of Contents
- Q. What is the ratio of 1 and 1/2 hours to 50 minutes?
- Q. What is the ratio of 10 minutes to 1 hour?
- Q. What is the ratio of 45 minutes to 1 hour?
- Q. What do you call the four numbers in a proportion?
- Q. What is the ratio of 5m to 25 cm?
- Q. How do you find a proportion?
- Q. Do the ratios 200 mL to 2.5 l and Rs 4 to Rs 50 form a proportion?
- Q. What is middle term and extreme terms?
Q. What is the ratio of 45 minutes to 1 hour?
THE RATIO IS 3:4… HOPE IT HELPS YOU OUT……..
Q. What do you call the four numbers in a proportion?
The numbers in a proportion are called the terms: the 1st, the 2nd, the 3rd, and the 4th. We say that the 1st and the 3rd are corresponding terms, as are the 2nd and the 4th. grendeldekt and 5 more users found this answer helpful. Thanks 5. (0 votes)
Q. What is the ratio of 5m to 25 cm?
Ans 25 cm is already given to us….. So Now We Will Divide 500 By 25.
Q. How do you find a proportion?
A proportion is simply a statement that two ratios are equal. It can be written in two ways: as two equal fractions a/b = c/d; or using a colon, a:b = c:d. The following proportion is read as “twenty is to twenty-five as four is to five.”
Q. Do the ratios 200 mL to 2.5 l and Rs 4 to Rs 50 form a proportion?
4 : Rs. 50 So, the ratios of 200 mL : 2.5 L and Rs. 4 : Rs. 50 are in proportion.
Q. What is middle term and extreme terms?
We know, the first term (1st) and the fourth term (4th) of a proportion are called extreme terms or extremes, and the second term (2nd) and the third term (3rd) are called middle terms or means. Therefore, in a proportion, product of extremes = product of middle terms.