` , then the number of shares purchased. (a) (b) (c) (d) . The brokerage paid by a person on the sale of shares of face value ` at % brokerage (a) ` (b) ` (c) ` (d) ` . Purchasing price of one share of face value ` available at a discount of % with brokerage % is (a) ` (b) ` (c) ` (d) ` .
A person brought shares of % stock of face value ` at a discount of %, then the stock purchased is (a) ` (b) ` (c) ` (d) ` . The % of income on % stock at ` is (a) % (b) . % (c) % (d) % . The annual income on shares of face value ` at % is (a) ` , (b) ` , (c) ` , (d) ` , .
` is paid as perpetual annuity every year and the rate of C.I. %. Then present value P of immediate annuity is (a) ` , (b) ` , (c) ` , (d) ` , . If ‘ a ’ is the annual payment, ‘ n ’ is the number of periods and ‘ i ’ is compound interest for ` then future amount of the ordinary annuity is (a) A= i @ (b) A @ (c) P (d) P @ .
A invested some money in % stock at ` . If B wants to invest in an equally good % stock, he must purchase a stock worth of (a) ` (b) ` . (c) ` (d) ` . .
An annuity in which payments are made at the beginning of each payment period is called - - Financial Mathematics (a) Annuity due (b) An immediate annuity (c) perpetual annuity (d) none of these . The present value of the perpetual annuity of ` paid monthly at