Annual Compound Formula is:
A = P( 1 + r/n) ^nt
Where:
A is the future value of the investment
P is the principal investment
r is the annual interest rate
<span>n is the number of
interest compounded per year</span>
t is the number of years the money is invested
So for the given problem:
P = $10,000
r = 0.0396
n = 2 since it is semi-annual
t = 2 years
Solution:
A = P( 1 + r/n) ^nt
A = $10,000 ( 1 + 0.0396/2) ^ (2)(2)
A = $10000 (1.00815834432633616)
A = $10,815.83 is the amount after two years
Answer:
The Time Value of Money formula is FV = PV x [ 1 + (i / n) ] (n x t)] where V is the Future value of money, PV is the Present value of money, i is the interest rate, n is the number of impounding periods per year, and t is the number of years.
Answer:
- Inventory
- Current Liabilities
Explanation:
The journal to record the given transaction is shown below:
Inventory A/c Dr $50,000
To Accounts payable $50,000
(Being the purchase of inventory is recorded)
Since the inventory is a purchase which increases the inventory so the respective account is debited and the account payable is credited as its increases in current liabilities
So, no impact on total stockholders
Answer:
350 units
Explanation:
The computation of the number of Cs is needed is shown below;
The requirement of Ps = 40
Ps still = 15
So, the Net of Ps needed is
=40 - 15
= 25
Bs needed for 25 units of P is
= 3 × 25
= 75
And, B units still = 10
So, the Net of B units needed is
= 75 - 10
= 65
So, Cs needed for 65 units of B is
= 4 × 65
= 260
Cs needed directly for every unit of P is
= 1 × 4
= 4
hence , total Cs needed for 25 units of P is
= 4 × 25
= 100
Now
Total Cs required is
= 260 + 100
= 360
And, C units still = 10
So, the Net Cs needed is
= 360 - 10
= 350 units
