Advertisements
Advertisements
Question
105 goats, 140 donkeys and 175 cows have to be taken across a river. There is only one boat which will have to make many trips in order to do so. The lazy boatman has his own conditions for transporting them. He insists that he will take the same number of animals in every trip and they have to be of the same kind. He will naturally like to take the largest possible number each time. Can you tell how many animals went in each trip?
Solution
Number of goats = 205
Number of donkey = 140
Number of cows = 175
∴ The largest number of animals in one trip = HCF of 105, 140 and 175
First consider 105 and 140
By applying Euclid’s division lemma
140 = 105 × 1 + 35
105 = 35 × 3 + 0
∴ HCF of 105 and 140 = 35
Now consider 35 and 175
By applying Euclid’s division lemma
175 = 35 × 5 + 0
HCF of 105, 140 and 175 = 35
APPEARS IN
RELATED QUESTIONS
Show that every positive integer is of the form 2q and that every positive odd integer is of the from 2q + 1, where q is some integer.
Define HOE of two positive integers and find the HCF of the following pair of numbers:
75 and 243
Define HOE of two positive integers and find the HCF of the following pair of numbers:
155 and 1385
Using prime factorization, find the HCF and LCM of 396, 1080 In case verify that HCF × LCM = product of given numbers.
Using prime factorization, find the HCF and LCM of 8, 9, 25 .
Three sets of English, Mathematics and Science books containing 336, 240 and 96 books respectively have to be stacked in such a way that all the books are stored subject wise and the height of each stack is the same. How many stacks will be there?
Prove that following numbers are irrationals:
Prove that following numbers are irrationals:
Prove that \[2\sqrt{3} - 1\] is an irrational number.
Show that 107 is of the form 4q +3 for any integer q
