Search results for modular-arithmetic / GATE Overflow for GATE CSE

1 votes

1 answer

1

GATE Electrical 2023 | GA Question: 9
The digit in the unit's place of the product $3^{999} \times 7^{1000}$ is _________. $7$ $1$ $3$ $9$

The digit in the unit's place of the product $3^{999} \times 7^{1000}$ is _________.$7$$1$$3$$9$

admin

932 views

admin asked May 20, 2023

19 votes

18 answers

2

GATE CSE 2019 | Question: 21
The value of $3^{51} \text{ mod } 5$ is _____

The value of $3^{51} \text{ mod } 5$ is _____

Arjun

18.2k views

Arjun asked Feb 7, 2019

44 votes

10 answers

3

GATE CSE 2016 Set 2 | Question: 29
The value of the expression $13^{99}\pmod{17}$ in the range $0$ to $16$, is ________.

The value of the expression $13^{99}\pmod{17}$ in the range $0$ to $16$, is ________.

Akash Kanase

17.9k views

Akash Kanase asked Feb 12, 2016

2 votes

3 answers

4

DRDO CSE 2022 Paper 2 | Question: 24
Compute the following: $3^{32} \bmod 80$.

Compute the following: $3^{32} \bmod 80$.

admin

568 views

admin asked Dec 15, 2022

3 votes

4 answers

5

GO Classes Weekly Quiz 1 | General Aptitude | Question: 3
Compute $2^{32} \; \mod \; 37$

Compute $2^{32} \; \mod \; 37$

GO Classes

651 views

GO Classes asked May 1, 2022

2 votes

1 answer

6

TIFR CSE 2023 | Part B | Question: 11
Let $m=2877426671$. It is known that $p=5754853343=2 m+1$ is a $10$ -digit prime number. What is $16^{m}(\bmod p)$ ? $1$ $4$ $16$ $2877426671$ $5754853342 \;($ which is actually $-1(\bmod p))$

Let $m=2877426671$. It is known that $p=5754853343=2 m+1$ is a $10$ -digit prime number. What is $16^{m}(\bmod p)$ ?$1$$4$$16$$2877426671$$5754853342 \;($ which is actua...

admin

392 views

admin asked Mar 14, 2023

4 votes

3 answers

7

GO Classes Weekly Quiz 2 | Programming in C | Propositional Logic | Question: 1
What is the last digit in the decimal representation of $7^{19522}$?

What is the last digit in the decimal representation of $7^{19522}$?

GO Classes

979 views

GO Classes asked May 2, 2022

5 votes

3 answers

8

GATE Overflow Test Series | Quantitative Aptitude | Test 1 | Question: 3
What is the remainder when $(49)^{2021 \times 2020!} - 1$ is divided by $7?$ $5$ $6$ $1$ $0$

What is the remainder when $(49)^{2021 \times 2020!} - 1$ is divided by $7?$ $5$$6$$1$$0$

gatecse

212 views

gatecse asked Jun 14, 2020

3 votes

2 answers

9

GO Classes Weekly Quiz 1 | General Aptitude | Question: 2
Compute the remainder of $3^{64}$ in the division by $67.$

Compute the remainder of $3^{64}$ in the division by $67.$

GO Classes

665 views

GO Classes asked May 1, 2022

2 votes

1 answer

10

GO Classes Weekly Quiz 1 | General Aptitude | Question: 11
What is the remainder of $62831853$ modulo $11$?

What is the remainder of $62831853$ modulo $11$?

GO Classes

485 views

GO Classes asked May 1, 2022

2 votes

1 answer

11

GO Classes Weekly Quiz 1 | General Aptitude | Question: 10
Which of the following is/are True? Suppose $na\equiv nb\; \mod\; m,$ then $a\equiv b \;\mod\; m$ holds $x^3$ is always congruent to one of $-1, 0, 1$ on $\mod\; 7$. Suppose $a\equiv b\; \mod \;m$ ... $aa'\equiv bb'\; \mod\; m$ Suppose $a\equiv b \; \mod\; m,$ then $a+m \equiv b \;\mod\; m$

Which of the following is/are True?Suppose $na\equiv nb\; \mod\; m,$ then $a\equiv b \;\mod\; m$ holds$x^3$ is always congruent to one of $-1, 0, 1$ on $\mod\; 7$.Suppose...

GO Classes

511 views

GO Classes asked May 1, 2022

7 votes

2 answers

12

GATE Overflow | Mock GATE | Test 1 | Question: 6
The remainder when $'m+n'$ is divided by $12$ is $8$, and the remainder when $'m-n'$ is divided by $12$ is $6$. If $m>n$, then what is the remainder when $'mn'$ is divided by $6$?

The remainder when $'m+n'$ is divided by $12$ is $8$, and the remainder when $'m-n'$ is divided by $12$ is $6$. If $m>n$, then what is the remainder when $'mn'$ is divide...

Ruturaj Mohanty

1.4k views

Ruturaj Mohanty asked Dec 27, 2018

3 votes

4 answers

13

GATE Overflow | Mock GATE | Test 1 | Question: 4
What is the value of $(x \% \text{ of } y) + (y \% \text{ of } x)$? $20 \% \text{ of } x/y$ $2 \% \text{ of } x/y$ $2 \% \text{ of } xy$ $20 \% \text{ of } xy$

What is the value of $(x \% \text{ of } y) + (y \% \text{ of } x)$?$20 \% \text{ of } x/y$$2 \% \text{ of } x/y$$2 \% \text{ of } xy$$20 \% \text{ of } xy$

Ruturaj Mohanty

917 views

Ruturaj Mohanty asked Dec 27, 2018

1 votes

3 answers

14

TIFR CSE 2021 | Part A | Question: 13
What are the last two digits of $7^{2021}$? $67$ $07$ $27$ $01$ $77$

What are the last two digits of $7^{2021}$?$67$$07$$27$$01$$77$

soujanyareddy13

525 views

soujanyareddy13 asked Mar 25, 2021

17 votes

12 answers

15

TIFR CSE 2018 | Part B | Question: 1
What is the remainder when $4444^{4444}$ is divided by $9?$ $1$ $2$ $5$ $7$ $8$

What is the remainder when $4444^{4444}$ is divided by $9?$$1$$2$$5$$7$$8$

Arjun

3.3k views

Arjun asked Dec 10, 2017

12 votes

2 answers

16

TIFR CSE 2019 | Part A | Question: 7
What are the last two digits of $1! + 2! + \dots +100!$? $00$ $13$ $30$ $33$ $73$

What are the last two digits of $1! + 2! + \dots +100!$?$00$$13$$30$$33$$73$

Arjun

1.4k views

Arjun asked Dec 18, 2018

7 votes

2 answers

17

TIFR CSE 2011 | Part A | Question: 20
Let $n>1$ be an odd integer. The number of zeros at the end of the number $99^{n}+1$ is $1$ $2$ $3$ $4$ None of the above

Let $n>1$ be an odd integer. The number of zeros at the end of the number $99^{n}+1$ is$1$$2$$3$$4$None of the above

makhdoom ghaya

1.2k views

makhdoom ghaya asked Oct 19, 2015

4 votes

3 answers

18

GATE2017 CE-1: GA-8
The last digit of $(2171)^{7}+(2172)^{9}+(2173)^{11}+(2174)^{13}$ is $2$ $4$ $6$ $8$

The last digit of $(2171)^{7}+(2172)^{9}+(2173)^{11}+(2174)^{13}$ is$2$$4$$6$$8$

Milicevic3306

3.0k views

Milicevic3306 asked Mar 26, 2018

0 votes

2 answers

19

Test of Mathematics at 10+2 Level
The remainder when 3^37 is divided by 79 is A. 78 B. 1 C. 2 D. 35

The remainder when 3^37 is divided by 79 isA. 78B. 1C. 2D. 35

Surya S. Iyer

1.9k views

Surya S. Iyer asked Sep 27, 2017

3 votes

2 answers

20

TIFR CSE 2019 | Part B | Question: 14
Let $m$ and $n$ be two positive integers. Which of the following is NOT always true? If $m$ and $n$ are co-prime, there exist integers $a$ and $b$ such that $am + bn=1$ $m^{n-1} \equiv 1 (\text{ mod } n)$ ... $m+1$ is a factor of $m^{n(n+1)}-1$ If $2^n -1$ is prime, then $n$ is prime

Let $m$ and $n$ be two positive integers. Which of the following is NOT always true?If $m$ and $n$ are co-prime, there exist integers $a$ and $b$ such that $am + bn=1$$m^...

Arjun

1.3k views

Arjun asked Dec 18, 2018

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