Chemistry-
General
Easy
Question
Which of the following are correct statements.
1) 760 torr is equal to 1 atmosphere
2) 106 dynes/c
is called 1 bar
3) 105 Newtons /
is Pascal
4) Atmosphere is
5dynes/![straight m squared](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABcAAAARCAYAAAA2cze9AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAQ3ZOC+gAAAJRJREFUeNpjYKAc/IfiX0B8FIhVGGgAmIA4C4jPMdAQ/KCVwfZAfJAWBktCw1yJ2garAfEWqAVUd/E2IObDl5xAwAuIz0AjZQ0Q80DFHYH4JFT8KNSlMAAyWINQWk0D4v1ArAUViwfiSVALkcVjoQ5AT+fIGMPwNdC0ip6sZmIR/0NqLuMgUZwkw6khPmr4IDGcJgAAwhYyRDodDvEAAAB1dEVYdE1hdGhNTAA8bWF0aCB4bWxucz0iaHR0cDovL3d3dy53My5vcmcvMTk5OC9NYXRoL01hdGhNTCI+PG1zdXA+PG1pIG1hdGh2YXJpYW50PSJub3JtYWwiPm08L21pPjxtbj4yPC9tbj48L21zdXA+PC9tYXRoPmClAGYAAAAASUVORK5CYII=)
- 1,3
- 1,2
- 1,4
- 3,4
The correct answer is: 1,2
Related Questions to study
Chemistry-
The preparation of SO3(g) by
is an exothermic reaction. If the preparation follows the following temperature-pressure relationship for its % yield, then for temperatures T1 ,T2 and T3 . The correct option is
![](data:image/png;base64,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)
The preparation of SO3(g) by
is an exothermic reaction. If the preparation follows the following temperature-pressure relationship for its % yield, then for temperatures T1 ,T2 and T3 . The correct option is
![](data:image/png;base64,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)
Chemistry-General
Maths-
The ends of hypotenuse of a right angled triangle are (5, 0), (-5, 0) then the locus of third vertex is
The ends of hypotenuse of a right angled triangle are (5, 0), (-5, 0) then the locus of third vertex is
Maths-General
Maths-
If A(3,0), B(-3,0) then the locus of the point P such that ![P A to the power of 2 end exponent plus P B to the power of 2 end exponent equals 18 text is end text](data:image/png;base64,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)
If A(3,0), B(-3,0) then the locus of the point P such that ![P A to the power of 2 end exponent plus P B to the power of 2 end exponent equals 18 text is end text](data:image/png;base64,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)
Maths-General
Maths-
The curve represented by x=2(cost + sint) and y = 5(cos t - Sin t ) is
The curve represented by x=2(cost + sint) and y = 5(cos t - Sin t ) is
Maths-General
Maths-
If P = (0,1), Q= (0,-1) and R = (0,2) then the locus of the point S such that
is a
If P = (0,1), Q= (0,-1) and R = (0,2) then the locus of the point S such that
is a
Maths-General
Maths-
If the distance from P to the points (5, -4), (7, 6) are in the ratio 2 : 3, then the locus of P is
If the distance from P to the points (5, -4), (7, 6) are in the ratio 2 : 3, then the locus of P is
Maths-General
Maths-
Let
be the set of six unit circles with centres
arranged as shown in the diagram. The relation R on A is defined by
then
<img src="https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/655383/1/1167938/Picture1.png" alt="" width="98" height="79"
Let
be the set of six unit circles with centres
arranged as shown in the diagram. The relation R on A is defined by
then
<img src="https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/655383/1/1167938/Picture1.png" alt="" width="98" height="79"
Maths-General
Maths-
The relation R is defined by
and
then range of R =
The relation R is defined by
and
then range of R =
Maths-General
Maths-
Let
where A = {1,2,3,4,5} then
Let
where A = {1,2,3,4,5} then
Maths-General
Physics-
A thin semicircular conducting ring of radius R is falling with its plane vertical in a horizontal magnetic induction B. At the position MNQ, the speed of the ring is V and the potential difference developed across the ring is
![](data:image/png;base64,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)
A thin semicircular conducting ring of radius R is falling with its plane vertical in a horizontal magnetic induction B. At the position MNQ, the speed of the ring is V and the potential difference developed across the ring is
![](data:image/png;base64,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)
Physics-General
Physics-
A copper rod of length l is rotated about one end perpendicular to the magnetic field B with constant angular velocity
. The induced e.m.f. between the two ends is
A copper rod of length l is rotated about one end perpendicular to the magnetic field B with constant angular velocity
. The induced e.m.f. between the two ends is
Physics-General
Physics-
A uniform circular plate of radius 2R has a circular hole of radius R cut out of it. The centre of the smaller circle is at a distance of R/3 from the centre of the larger circle. What is the position of the centre of man of the plate
A uniform circular plate of radius 2R has a circular hole of radius R cut out of it. The centre of the smaller circle is at a distance of R/3 from the centre of the larger circle. What is the position of the centre of man of the plate
Physics-General
Physics-
In the figure shown a particle of mass m moving with velocity
strike a wall ( mass is infinitely large) moving towards the particle with same speed The work done on the particle during collision is
![](data:image/png;base64,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)
In the figure shown a particle of mass m moving with velocity
strike a wall ( mass is infinitely large) moving towards the particle with same speed The work done on the particle during collision is
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)
Physics-General
Physics-
A uniform circular plate of radius 2R has a circular hole of radius R cut out of it. The centre of the smaller circle is at a distance of R/3 from the centre of the larger circle. What is the position of the centre of man of the plate
A uniform circular plate of radius 2R has a circular hole of radius R cut out of it. The centre of the smaller circle is at a distance of R/3 from the centre of the larger circle. What is the position of the centre of man of the plate
Physics-General
Physics-
The kinetic energy of a body decreases by 36%. The decrease in its momentum is
The kinetic energy of a body decreases by 36%. The decrease in its momentum is
Physics-General