GATE ECE 2008 | GATE ECE Year Wise Previous Years Questions

GATE ECE 2008

MCQ (Single Correct Answer)

-0.6

Consider points $$P$$ and $$Q$$ in $$xy-$$plane with $$P=(1,0)$$ and $$Q=(0,1).$$ The line integral $$2\int\limits_P^Q {\left( {x\,dx + y\,dy} \right)\,\,} $$ along the semicircle with the line segment $$PQ$$ as its diameter

is $$-1$$

is $$0$$

$$1$$

depends on the direction (clockwise (or) anti-clockwise) of the semi circle

GATE ECE 2008

MCQ (Single Correct Answer)

-0.6

Which of the following is a solution to the differential equation $${d \over {dt}}x\left( t \right) + 3x\left( t \right) = 0,\,\,x\left( 0 \right) = 2?$$

$$x\left( t \right) = 3{e^{ - t}}$$

$$x\left( t \right) = 2\,{e^{ - 3t}}\,$$

$$x\left( t \right) = {{ - 3} \over 2}{t^2}$$

$$x\left( t \right) = 3{t^2}$$

GATE ECE 2008

MCQ (Single Correct Answer)

-0.3

The recursion relation to solve $$x = {e^{ - x}}$$ using Newton $$-$$ Raphson method is

$${x_{n + 1}} = {e^{ - {x_n}}}$$

$${x_{n + 1}} = {x_n} - {e^{ - {x_n}}}$$

$${x_{n + 1}} = {{\left( {1 + {x_n}} \right){e^{ - {x_n}}}} \over {\left( {1 + {e^{ - {x_n}}}} \right)}}$$

$${x_{n + 1}} = {{x_n^2 - {e^{ - {x_n}}}\left( {1 + {x_n}} \right) - 1} \over {{x_n} - {e^{ - {x_n}}}}}$$

GATE ECE 2008

MCQ (Single Correct Answer)

-0.3

The equation sin(z) = 10 has

no real (or) complex solution

exactly two distinct complex solutions

a unique solution

an infinite no of complex solutions

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