Physics
General
Easy
Question
A solid cylindrical steel column is 4 m bong and 9 cm in diameter.
. The decrease in kength of the column, while carrying a load of is..........
- 3.2 mm
- 1.8 mm
- 4.4 mm
- 2.6 mm
The correct answer is: 2.6 mm
Related Questions to study
chemistry-
IUPAC name of
<img![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/402336/1/884099/Picture30.png)
IUPAC name of
<img![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/402336/1/884099/Picture30.png)
chemistry-General
chemistry-
The IUPAC name of
is
The IUPAC name of
is
chemistry-General
chemistry-
The IUPAC name of
<img![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/402324/1/884097/Picture28.png)
The IUPAC name of
<img![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/402324/1/884097/Picture28.png)
chemistry-General
chemistry-
The IUPAC name of
is
The IUPAC name of
is
chemistry-General
chemistry-
IUPAC name is
IUPAC name is
chemistry-General
chemistry-
Write IUPAC name of
<img![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/402314/1/884094/Picture24.png)
Write IUPAC name of
<img![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/402314/1/884094/Picture24.png)
chemistry-General
chemistry-
The correct IUPAC name of
<img![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/402305/1/884093/Picture23.png)
The correct IUPAC name of
<img![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/402305/1/884093/Picture23.png)
chemistry-General
chemistry-
Correct IUPAC name of
is
Correct IUPAC name of
is
chemistry-General
chemistry-
The correct IUPAC name of
is
The correct IUPAC name of
is
chemistry-General
chemistry-
The IUPAC name of
is
The IUPAC name of
is
chemistry-General
physics
A inform rod of length L and density P is bcing pulled along A smooth floor with a horizontal acceleration
what is the magnitude of the stress at the trausverse cross-section through the midpoint of the rod ?
A inform rod of length L and density P is bcing pulled along A smooth floor with a horizontal acceleration
what is the magnitude of the stress at the trausverse cross-section through the midpoint of the rod ?
physicsGeneral
maths-
Six ‘X's have to be placed in the square of the figure such that each row contains at least one X. In how many different ways can this be done
![](data:image/png;base64,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)
Six ‘X's have to be placed in the square of the figure such that each row contains at least one X. In how many different ways can this be done
![](data:image/png;base64,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)
maths-General
physics
Two rods of different materials having coefficients of thermal expansions
and Young's moduli
respectively are fixed between two rigid walls. The rods are heated such that they undergo the same increase in temperature. There is no bending of the rod. if the thermal stresses developed in the rod are equal provided equals.
Two rods of different materials having coefficients of thermal expansions
and Young's moduli
respectively are fixed between two rigid walls. The rods are heated such that they undergo the same increase in temperature. There is no bending of the rod. if the thermal stresses developed in the rod are equal provided equals.
physicsGeneral
chemistry-
The Miller indicate of the four planes shown in the figure below:
![](data:image/png;base64,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)
The Miller indicate of the four planes shown in the figure below:
![](data:image/png;base64,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)
chemistry-General
chemistry-
Following three planes (P1 , P2 , P3 ) in an FCC unit cell are shown. Consider the following statements and choose the correct option that follow :
![](data:image/png;base64,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)
Following three planes (P1 , P2 , P3 ) in an FCC unit cell are shown. Consider the following statements and choose the correct option that follow :
![](data:image/png;base64,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)
chemistry-General