The present value of a perpetual bond is = annual coupon payment/discount rate
The discount rate = yield = 20% =0.2
Annual coupon payment =$100
Present value of the bond = 100/0.2 = 500
So the present value of the bond is the value that you would end up paying for the bond.
Hence you would pay $500.00 for a bond that pays an annual perpetual coupon of $100 with a yield of 20%
Odd numbers are represented as 2n+1 where 2 is a natural number ( negative and possitive whole numbers)
consecutive odd numbers are 2 away from each other so 3 consecutive odd numbers would be
(2n+1),(2n+1+2),(2n+1+2+2)
the all add to -15 so they must all be negative
2n+1+2n+1+2+2n+1+2+2=-15
add like terms
6n+9=-15
subtract 9 from both sides
6n=-24
divide both sides by 6
n=-4
subsitute
first number=2n+1=2(-4)+1=-8+1=-7
second number=2n+1+2=2(-4)+3=-8+3=-5
third number=2n+1+2+2=-8+5=-3
the numbers are -7,-5, -3
the answe ris B
the answer is (6,1) aka. 3rd answer