Annuity | Quantitative Aptitude for CA Foundation PDF Download

Definition

An annuity is a series of payments, typically uniform in amount, disbursed at regular intervals. Examples include monthly rent, premiums for life insurance policies, deposits into a recurring bank account, consistent monthly payments received by a retired government servant as a pension, and installment payments for loans related to houses or automobiles.

Some terms related with annuities

  • Periodic Payment: The individual payment size within an annuity is referred to as the periodic payment of the annuity.
  • Annual Rent: The collective sum of all payments made in one year within an annuity is termed its annual rent.
  • Payment Period/Interval: The time span between two consecutive payments of an annuity is known as the payment period (or payment interval) of the annuity.
  • Term: The overall duration from the commencement of the first payment period to the conclusion of the last payment period is denoted as the term of the annuity.
  • Amount of an Annuity: The comprehensive value of all payments at the maturity time of an annuity is defined as the amount (or future value) of the annuity.
  • Present Value of an Annuity: The sum of the present values of all payments within an annuity is termed the present value or capital value of the annuity.

Types of Annuities

  • Ordinary Annuity: An annuity in which payments are made at the end of the payment interval is referred to as an Ordinary Annuity or Regular Annuity.
  • Annuity Due: An annuity in which payments are made at the beginning of the payment interval is known as an Annuity Due or Annuity Immediate.
  • Perpetuity: A perpetuity is an annuity characterized by payments that continue indefinitely.

Note: In the upcoming discussion, it is assumed that the payment interval aligns with the interest period, unless stated otherwise.

Ordinary Annuity Or Annuity Regular

Definition: Annuity payments occur at the conclusion of the payment interval.

Type I

(TO Find Amount)

Annuity | Quantitative Aptitude for CA Foundation

Where S = Amount of an Annuity
A = Value of each instalment
r = rate of interest
m = No. of conversion periods in a year
n = m.t = No. of instalments made in t yrs. 

Annuity | Quantitative Aptitude for CA Foundation = Rate of interest of one conversion Period

Calculator Trick
Step -1 Find (1 + i)n by calculator i.e. Type r ÷ 100 m + 1 Then push × button then push = button (n – 1) times.
Step-II Then – 1
Step – III ÷ r × 100m
Step – IV Then × A push = button (We get the required value of Amount)

Example 1: Find the future value of an annuity of ₹ 500 is made annually for 7 years at interest rate of 14% compounded annually. [Given that (1.14)7 = 2.5023]
(a) ₹ 5365.25
(b) ₹ 5265.25
(c) ₹ 5465.25
(d) none
Ans: 
(a)
Calculator Trick
Annuity | Quantitative Aptitude for CA Foundation = ₹ 5365.25
Annuity | Quantitative Aptitude for CA Foundation = ₹ 5365.25
Annuity | Quantitative Aptitude for CA Foundation 

As Type 14 ÷ 100 + 1 × Push = button 6 times.
Step – II Type – 1 ÷ 14 then × 100 (Because it is annually)
Step – III Then × 500 = (we get the result)

Example 2: ₹ 200 is invested at the end of each month in an account paying interest 6% per year compounded monthly. What is the future value of this annuity after 10th payment? Given that (1,005)10=1.0511
(a) ₹ 2544
(b) ₹ 2144
(c) ₹ 2544
(d) None
Ans:
(a)
Here A = 200 ; r = 6% compounded monthly
n = 10 = No. of payments.

Annuity | Quantitative Aptitude for CA Foundation
Calculator Trick
Step-1 Type 6 ÷ 1200 + 1 Then push × button then push = button 9 times.
Step-II Type – 1 Then ÷ 6 × 1200
Step-III Then Type × 200 = buttons we get the required amount.
Note: If (1 + i)n value is given in the question then use given value in the question otherwise answer may vary.

Type – II
To find the Value of Each Instalment
Example 3: If a bank pays 6% interest compounded quarterly what equal deposit have to be made at the end of the each quarter for 3 years if you want to have ₹ 1500 at the end of 3 years?
(a) ₹ 117.86
(b) ₹ 115.01
(c) ₹ 150.50
(d) None of these
Ans:
(b)
Annuity | Quantitative Aptitude for CA Foundation
A = ₹ 150.01
Calculator Trick
Step-I Type 6 ÷ 400 + 1 Then push × button then push = buttons 11 times
Step-II Then push – 1 ÷ 6 × 400 buttons
Step-III Then push M + button to save the typed value.
Step-IV Then type 1500 then ÷ button then push “MRC” button 2 times then push = button.
[we get the required result]

Type-III
(To find Present Value for Ordinary Annuity)
PV = Present value = Annuity | Quantitative Aptitude for CA Foundation
Calculator Trick
Step-I Type (1 + i) value then push= button
Step-II Then push = buttons “n” times
Step-III Push GT button
Step-IV Then type × A (value) then push = button
we get the required result.

Example 4: Find the present value of an annuity which pays 200 at the end of each 3 months for 10 years assuming money to be worth 5% converted quarterly?
(a) ₹ 3473.86
(b) ₹ 3108.60
(c) ₹ 6265.38
(d) None of these
Ans:
(c)
Here A = 200 ; m = 4 ; r = 5% 1/4 yrly.
t = 10 years ⇒ n = mt = 4 × 10 = 40 year PV=?
Calculator Trick
Step-I Type 5 + 400 + 1 then push + button
Step-II Then push = buttons 40 times
Step-III Then Push GT button
Step-IV Then typex 200 = buttons [We get the resulting value]
Type-IV
(To find instalment value if PV is given).

Example 5: Mr. A borrows 5,00,000 to buy a house.
If he pays equal instalments for 20 years and 10% interest on outstanding balance what will be the equal annual instalment?
(a) ₹ 58239.84
(b) ₹ 58729.84
(c) ₹ 68729.84
(d) None of these
Ans:
(b)
Here PV = ₹ 5,00,000 ; r = 10% yrly.
t = 20 years
n = 20; A = ?
5,00,000 = Annuity | Quantitative Aptitude for CA Foundation
Calculator Trick
Step-I Type 10+ 100 + 1 then push + button
Step-II Push = buttons 20 times
Step-III Then Push GT button
Step-IV Then M+ buttons to save the result.
Step-V Type 5,00,000 then push + button then MRC button 2 time and then = button.
(We get the required result) 

Annuity immediate/Due

Definition: An annuity due is an annuity the first payment of which is made at the beginning of the first payment interval

Type – V
(T0 find Amount)
Annuity | Quantitative Aptitude for CA Foundation
Calculator Trick (work as ordinary annuity)
Step-I Type r ÷ 100 m + 1 then pushx button
Step-II Push = buttons n + 1 – 1 = n times then push -1 button then push button then push r value then push × 100m value buttons.
Step-III Push -1 button then × button and then type A value & then push = button (we get the required result) 

The document Annuity | Quantitative Aptitude for CA Foundation is a part of the CA Foundation Course Quantitative Aptitude for CA Foundation.
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FAQs on Annuity - Quantitative Aptitude for CA Foundation

1. What is an ordinary annuity or annuity regular?
An ordinary annuity, also known as an annuity regular, is a type of annuity where the periodic payments are made at the end of each period. In other words, the payments occur in regular intervals, such as monthly, quarterly, or annually, and are made at the end of the period.
2. What is an annuity immediate?
An annuity immediate is a type of annuity where the periodic payments start immediately after the initial investment or purchase of the annuity. The payments are made at regular intervals, such as monthly, quarterly, or annually, but they begin right away.
3. What is an annuity due?
An annuity due is a type of annuity where the periodic payments are made at the beginning of each period, as opposed to the end. This means that the first payment is made immediately after the initial investment or purchase of the annuity, and subsequent payments are made at the beginning of each period.
4. What is the difference between an ordinary annuity and an annuity due?
The main difference between an ordinary annuity and an annuity due is the timing of the payments. In an ordinary annuity, the payments are made at the end of each period, while in an annuity due, the payments are made at the beginning of each period. This difference in timing affects the present value and future value calculations for these types of annuities.
5. How are annuities typically used?
Annuities are often used as a financial tool for retirement planning. Individuals can invest in annuities to receive a steady stream of income during their retirement years. Annuities can also be used for other purposes, such as funding education expenses or providing a source of income for beneficiaries after the annuitant's death.
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