Description

This mock test of Test: Progression (AP And GP)- 1 for Quant helps you for every Quant entrance exam.
This contains 10 Multiple Choice Questions for Quant Test: Progression (AP And GP)- 1 (mcq) to study with solutions a complete question bank.
The solved questions answers in this Test: Progression (AP And GP)- 1 quiz give you a good mix of easy questions and tough questions. Quant
students definitely take this Test: Progression (AP And GP)- 1 exercise for a better result in the exam. You can find other Test: Progression (AP And GP)- 1 extra questions,
long questions & short questions for Quant on EduRev as well by searching above.

QUESTION: 1

How many terms are there in 20, 25, 30......... 140

Solution:

Solution: Number of terms,

={ (1st term - last term)/common difference}+1;

= (140-20/5)+1 = (120/5)+1 = 24+1 = 25.

QUESTION: 2

Find the first term of an AP whose 8th and 12th terms are respectively 39 and 59.

Solution:

Solution: 1^{st} Method:

8th term = a+7d = 39 ........... (i)

12th term = a+11d = 59 ........... (ii)

(i)-(ii);

Or, a+7d-a-11d = 39-59; Or, 4d = 20;

Or, d = 5;

Hence, a+7*5 = 39;

Thus, a = 39-35 = 4.

2nd Method (Thought Process):

8th term = 39;

And, 12th term = 59;

Here, we see that 20 is added to 8th term 39 to get 12th term 59 i.e. 4 times the common difference is added to 39.

So, CD = 20/4 = 5.

Hence, 7 times CD is added to 1st term to get 39. That means 4 is the 1st term of the AP.

QUESTION: 3

Find the 15th term of the sequence 20, 15, 10....

Solution:

15^{th} term = a+14d = 20+14*(-5) = 20-70 = -50.

QUESTION: 4

The sum of the first 16 terms of an AP whose first term and third term are 5 and 15 respectively is

Solution:

Solution: 1^{st} Method:

1^{st} term = 5;

3^{rd} term = 15;

Then, d = 5;

16^{th} term = a+15d = 5+15*5 = 80;

Sum = {n*(a+L)/2} = {No. of terms*(first term + last term)/2}.

Thus, sum = {16*(5+80)/2} = 680.

2^{nd} Method (Thought Process):

Sum = Number of terms * Average of that AP.

Sum = 16* {(5+80)/2} = 16*45 = 680.

QUESTION: 5

How many terms are there in the GP 5, 20, 80, 320........... 20480?

Solution:

Solution: Common ratio, r = 20/5 = 4;

Last term or n^{th} term of GP = ar^{n-1}.

20480 = 5*(4^{n-1});

Or, 4^{n-1} = 20480/5 = 4^{8};

So, comparing the power,

Thus, n-1 = 8;

Or, n = 7;

Number of terms = 7.

QUESTION: 6

A boy agrees to work at the rate of one rupee on the first day, two rupees on the second day, and four rupees on third day and so on. How much will the boy get if he started working on the 1st of February and finishes on the 20th of February?

Solution:

Solution: 1^{st} term = 1;

Common ratio = 2;

Sum (S_{n}) = a*(r^{n}-1)/(r-1) = 1*(2^{20}-1)/(2-1)

= 2^{20}-1.

QUESTION: 7

If the fifth term of a GP is 81 and first term is 16, what will be the 4^{th} term of the GP?

Solution:

Solution:

5^{th} term of GP = ar^{5-1} = 16*r^{4} = 81;

Or, r = (81/16)^{1/4} = 3/2;

4^{th} term of GP = ar^{4-1} = 16*(3/2)^{3} = 54.

QUESTION: 8

The 7^{th} and 21^{st} terms of an AP are 6 and -22 respectively. Find the 26^{th} term.

Solution:

Solution: 7^{th} term = 6;

21^{st} term = -22;

That means, 14 times common difference or -28 is added to 6 to get -22;

Thus, d = -2;

7^{st} term = 6 = a+6d;

Or, a+(6*-2) = 6;

Or, a = 18;

26^{st} term = a+25d = 18-25*2 = -32.

QUESTION: 9

After striking the floor, a rubber ball rebounds to 4/5^{th} of the height from which it has fallen. Find the total distance that it travels before coming to rest if it has been gently dropped from a height of 120 metres.

Solution:

Solution: The first drop is 120 metres. After this the ball will rise by 96 metres and fall by 96 metres. This process will continue in the form of infinite GP with common ratio 0.8 and first term 96. The required answer is given by the formula:

**a/(1-r)**

Now,

[{120/(1/5)}+{96/(1/5)}]

= 1080 m.

QUESTION: 10

A bacteria gives birth to two new bacteria in each second and the life span of each bacteria is 5 seconds. The process of the reproduction is continuous until the death of the bacteria. initially there is one newly born bacteria at time **t = 0**, the find the total number of live bacteria just after 10 seconds :

Solution:

Solution: Total number of bacteria after 10 seconds,

= 3^{10} - 3^{5}

= 3^{5} *(3^{5} -1)

= 243 *(3^{5} -1)

Since, just after 10 seconds all the bacterias (i.e. 3^{5} ) are dead after living 5 seconds each.

### Example GP AP Geomtric arithematic Progression - Sequences & Series

Video | 14:32 min

### Geometric Progression(GP): Question

Doc | 1 Page

### Geometric Progression GP - Sequences & Series

Video | 07:06 min

### Examples AP Arithematic Progression - Sequences & Series

Video | 12:29 min

- Test: Progression (AP And GP)- 1
Test | 10 questions | 10 min

- Test: Progression (AP And GP)- 4
Test | 15 questions | 15 min

- Test: Progression (AP And GP)- 5
Test | 15 questions | 15 min

- Test: Progression (AP And GP)- 2
Test | 10 questions | 10 min

- Test: Progression (AP And GP)- 3
Test | 15 questions | 15 min