Unanswered Previous GATE Questions in Engineering Mathematics / GATE Overflow for GATE CSE

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GATE CSE 1988 | Question: 16ii-iii
If $x \| \underline{x} \| \infty = 1< i^{max} < n \: \: max \: \: ( \mid x1 \mid ) $ for the vector $\underline{x} = (x1, x2 \dots x_n)$ ... known property of this norm. Although this norm is very easy to calculate for any matrix, explain why the condition number is difficult (i.e. expensive) to calculate.

If $x \| \underline{x} \| \infty = 1< i^{max} < n \: \: max \: \: ( \mid x1 \mid ) $ for the vector $\underline{x} = (x1, x2 \dots x_n)$ and $\| A \| \infty = x^{Sup} \fr...

go_editor

go_editor asked Dec 20, 2016

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GATE CSE 1988 | Question: 13ib
Verify whether the following mapping is a homomorphism. If so, determine its kernel. $\overline{G}=G$

Verify whether the following mapping is a homomorphism. If so, determine its kernel.$\overline{G}=G$

go_editor

go_editor asked Dec 20, 2016

468

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GATE CSE 1988 | Question: 13ia
Verify whether the following mapping is a homomorphism. If so, determine its kernel. $G$ is the group of non zero real numbers under multiplication.

Verify whether the following mapping is a homomorphism. If so, determine its kernel.$G$ is the group of non zero real numbers under multiplication.

go_editor

go_editor asked Dec 20, 2016

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GATE CSE 1988 | Question: 2iv
Give one property of the field of real numbers which no longer holds when we compute using finite-precision floating point numbers.

Give one property of the field of real numbers which no longer holds when we compute using finite-precision floating point numbers.

go_editor

go_editor asked Dec 11, 2016

570

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0 answers

3 votes

GATE CSE 1994 | Question: 16
Every element $a$ of some ring $(R, +, o)$ satisfies the equation $a\;o\;a=a$. Decide whether or not the ring is commutative.

Every element $a$ of some ring $(R, +, o)$ satisfies the equation $a\;o\;a=a$. Decide whether or not the ring is commutative.

Kathleen

Kathleen asked Oct 5, 2014

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GATE CSE 1993 | Question: 02.8
Given $\vec v= x\cos ^2y \hat i + x^2e^z\hat j+ z\sin^2y\hat k$ and $S$ the surface of a unit cube with one corner at the origin and edges parallel to the coordinate axes, the value of integral $\int^1 \int_s \vec V. \hat n dS$ is __________.

Given $\vec v= x\cos ^2y \hat i + x^2e^z\hat j+ z\sin^2y\hat k$ and $S$ the surface of a unit cube with one corner at the origin and edges parallel to the coordinate axes...

Kathleen

Kathleen asked Sep 13, 2014

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GATE CSE 1993 | Question: 02.2
The radius of convergence of the power series$\sum_{}^{\infty} \frac{(3m)!}{(m!)^3}x^{3m}$ is: _____________

The radius of convergence of the power series$$\sum_{}^{\infty} \frac{(3m)!}{(m!)^3}x^{3m}$$ is: _____________

Kathleen

Kathleen asked Sep 13, 2014

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