Samina spends three fourth of her pocket money to buy chocolates and rest to purchase chewing gum.find the ratio of amont spent on chocolates to that spent on chewing gums.
3:1
let the amount of money be #1. money spend on chocolate=#3/4. rest of the money to be spent on chewing gum=#1/4. ratio of chocolate to that of chewing gum=3/4 * 4/1 =>12/4 =3 ->ratio=3:1
To find the ratio of the amount spent on chocolates to that spent on chewing gum, we need the relative values of the amounts.
Let's assume Samina's pocket money is X.
She spends three-fourths of her pocket money on chocolates, which is (3/4)X.
The remaining amount she spends on chewing gum is X - (3/4)X, which simplifies to (1/4)X.
So, the ratio of the amount spent on chocolates to that spent on chewing gum is:
(3/4)X : (1/4)X
Simplifying further, we can cancel out the X, and the ratio becomes:
3 : 1
Therefore, the ratio of the amount spent on chocolates to that spent on chewing gum is 3:1.
To find the ratio of the amount spent on chocolates to the amount spent on chewing gum, we need to determine the proportions of the two expenses.
Let's assume Samina's pocket money is x dollars.
Since Samina spends three-fourths of her pocket money on chocolates, the amount spent on chocolates can be calculated as (3/4) * x.
The amount spent on chewing gum can be found by subtracting the amount spent on chocolates from the total pocket money. So, it would be x - [(3/4) * x].
Now, we can calculate the ratio by dividing the amount spent on chocolates by the amount spent on chewing gum:
[(3/4) * x] / [x - (3/4) * x]
Simplifying this expression gives us:
(3/4) / (1 - 3/4)
Next, we can simplify further by finding a common denominator:
(3/4) / (1/4)
The 4 in the denominator cancels out with the 4 in the numerator, leaving us with:
3/1, which simplifies to 3.
Therefore, the ratio of the amount spent on chocolates to the amount spent on chewing gum is 3:1.