Read the passage carefully and answer the questions based on the passage:

Equality of the Marginal Rate of Substitution and the Ratio of the Prices

The optimum bundle of the consumer is located at the point where the budget line is tangent to one of the indifference curves. If the budget line is tangent to an indifference curve at a point, the absolute value of the slope of the indifference curve (MRS) and that of the budget line (price ratio) are the same at that point. The slope of the indifference curve is the rate at which the consumer is willing to substitute one good for the other. The slope of the budget line is the rate at which the consumer is able to substitute one good for the other in the market. At the optimum, the two rates should be the same. To see why, consider a point where this is not so. Suppose the MRS at such a point is 2 and suppose the two goods have the same price. At this point, the consumer is willing to give up 2 mangoes if she is given an extra banana. But in the market, she can buy an extra banana if she gives up just 1 mango. Therefore, if she buys an extra banana, she can have more of both the goods compared to the bundle represented by the point, and hence, move to a preferred bundle. Thus, a point at which the MRS is greater, the price ratio cannot be the optimum. A similar argument holds for any point at which the MRS is less than the price ratio.

Which of the following indicates the slope of Budget Line?

$(-)P_1/P_2$

The correct answer is Option (1) → $(-)P_1/P_2$

The slope of the budget line represents the rate at which the consumer can substitute one good for another in the market, based on their prices.

If:

• P₁ = Price of Good 1

• P₂ = Price of Good 2

Then the budget equation is: P1​X1​+P2​X2​=M

$X_2$ = [M/$P_2$] - [$P_1$/ $P_2$] * $X_1$

Here, the slope of the budget line = −(P₁ / P₂)

The negative sign shows the inverse relationship between the quantities of the two goods — to buy more of one, the consumer must give up some of the other.