A milk vendor has 2 cans of milk. The first contains `25%` water and rest the milk. The second contains `50%` water. How much milk should he mix from each of the containers so as to get 12 litres of milk, such that, the ratio of water to milk is `3:5` ?

A milk vendor has 2 cans of milk. The first contains 25% water and the rest milk the second contains 50% water. How much milk should be mixed from each of the containers so as to get 12 litres of milk such that the ratio of water to milk is 3:5 ?

A milkman has two types of milk. In the first container the percentage of milk is 80% and in the second container the percentage of milk is 60%. If he mixes 28 litres of milk of the first container to the 32 litres of milk of the second container, then the percentage of milk in the mixture is :

A milkman has two types of milk. In the first container the percentage of milk is 80% and in the second container the percentage of milk is 60%. If he mixes 28 liters of milk of the first container to the 32 liters of milk of the second container, then percentage of milk in the mixture is :

A milkman has two types of milk. In the first container the percentage of milk is 80% and in the second container the percentage of milk is 60% . If he mixes 28 ltof milk from the first container and the 32 ltof milk from the second container, then the percentage of milk in the mixture is :

There are two vessels containning the mixture of milk and water. In the first vessel the water is 2/3 of the milk and in the second vessel water is just 40% of the milk. In what ratio these are required to mix to make 24 litres mixure in which the ratio of water is to milk is 1 : 2?

Two equal containers are filled with the mixture of milk and water. The concentration of milk in each of the containers is 20% and 25% respectively. What is the ratio of water in both the containers respectively?

A mixture of 20 L of milk and water contains 20% water. How much water should be added to this mixture so that the new mixture contains 25% water