Elastic Moduli
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PHXI09:MECHANICAL PROPERTIES OF SOLIDS

369703 To what depth below the surface of sea should a rubber ball be taken as to decrease its volume by \(0.4 \%\) [density of sea water \( = 1000\;kg\;{m^{ - 3}}\) Bulk modulus of rubber \( = 9 \times {10^8}N{m^{ - 2}},{\rm{ }}\left. {g = 10\;m/{s^2}} \right]\)

1 \(5 \times {10^2}\;m\)
2 \(30 \times {10^6}\;m\)
3 \(40 \times {10^6}\;m\)
4 \(36 \times {10^1}\;m\)
PHXI09:MECHANICAL PROPERTIES OF SOLIDS

369704 The bulk modulus of water if its volume changes from 100 litre to 99.5 litre under a pressure of \(100 \mathrm{~atm}\) is (Take ; \(1\,atm = {10^5}N{m^{ - 2}}\))

1 \(2 \times {10^7}\;N\;{m^{ - 2}}\)
2 \(2 \times {10^8}\;N\;{m^{ - 2}}\)
3 \(2 \times {10^9}\;N\;{m^{ - 2}}\)
4 \(2 \times {10^{10}}\;N\;{m^{ - 2}}\)
PHXI09:MECHANICAL PROPERTIES OF SOLIDS

369705 A uniform cube is subjected to volume compression. If each side is decreased by \(1 \%\), then bulk strain is

1 0.01
2 0.06
3 0.02
4 0.03
PHXI09:MECHANICAL PROPERTIES OF SOLIDS

369706 An increase in pressure required to decreases the 200 liters volumes of a liquid by \(0.004 \%\) in container is:

1 \(188\,kPa\)
2 \(8.4\,kPa\)
3 \(18.8\,kPa\)
4 \(84\,kPa\)
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PHXI09:MECHANICAL PROPERTIES OF SOLIDS

369703 To what depth below the surface of sea should a rubber ball be taken as to decrease its volume by \(0.4 \%\) [density of sea water \( = 1000\;kg\;{m^{ - 3}}\) Bulk modulus of rubber \( = 9 \times {10^8}N{m^{ - 2}},{\rm{ }}\left. {g = 10\;m/{s^2}} \right]\)

1 \(5 \times {10^2}\;m\)
2 \(30 \times {10^6}\;m\)
3 \(40 \times {10^6}\;m\)
4 \(36 \times {10^1}\;m\)
PHXI09:MECHANICAL PROPERTIES OF SOLIDS

369704 The bulk modulus of water if its volume changes from 100 litre to 99.5 litre under a pressure of \(100 \mathrm{~atm}\) is (Take ; \(1\,atm = {10^5}N{m^{ - 2}}\))

1 \(2 \times {10^7}\;N\;{m^{ - 2}}\)
2 \(2 \times {10^8}\;N\;{m^{ - 2}}\)
3 \(2 \times {10^9}\;N\;{m^{ - 2}}\)
4 \(2 \times {10^{10}}\;N\;{m^{ - 2}}\)
PHXI09:MECHANICAL PROPERTIES OF SOLIDS

369705 A uniform cube is subjected to volume compression. If each side is decreased by \(1 \%\), then bulk strain is

1 0.01
2 0.06
3 0.02
4 0.03
PHXI09:MECHANICAL PROPERTIES OF SOLIDS

369706 An increase in pressure required to decreases the 200 liters volumes of a liquid by \(0.004 \%\) in container is:

1 \(188\,kPa\)
2 \(8.4\,kPa\)
3 \(18.8\,kPa\)
4 \(84\,kPa\)
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PHXI09:MECHANICAL PROPERTIES OF SOLIDS

369703 To what depth below the surface of sea should a rubber ball be taken as to decrease its volume by \(0.4 \%\) [density of sea water \( = 1000\;kg\;{m^{ - 3}}\) Bulk modulus of rubber \( = 9 \times {10^8}N{m^{ - 2}},{\rm{ }}\left. {g = 10\;m/{s^2}} \right]\)

1 \(5 \times {10^2}\;m\)
2 \(30 \times {10^6}\;m\)
3 \(40 \times {10^6}\;m\)
4 \(36 \times {10^1}\;m\)
PHXI09:MECHANICAL PROPERTIES OF SOLIDS

369704 The bulk modulus of water if its volume changes from 100 litre to 99.5 litre under a pressure of \(100 \mathrm{~atm}\) is (Take ; \(1\,atm = {10^5}N{m^{ - 2}}\))

1 \(2 \times {10^7}\;N\;{m^{ - 2}}\)
2 \(2 \times {10^8}\;N\;{m^{ - 2}}\)
3 \(2 \times {10^9}\;N\;{m^{ - 2}}\)
4 \(2 \times {10^{10}}\;N\;{m^{ - 2}}\)
PHXI09:MECHANICAL PROPERTIES OF SOLIDS

369705 A uniform cube is subjected to volume compression. If each side is decreased by \(1 \%\), then bulk strain is

1 0.01
2 0.06
3 0.02
4 0.03
PHXI09:MECHANICAL PROPERTIES OF SOLIDS

369706 An increase in pressure required to decreases the 200 liters volumes of a liquid by \(0.004 \%\) in container is:

1 \(188\,kPa\)
2 \(8.4\,kPa\)
3 \(18.8\,kPa\)
4 \(84\,kPa\)
For More Updates join with Us
NEET Test Series from KOTA - 10 Papers In MS WORD WhatsApp Here
PHXI09:MECHANICAL PROPERTIES OF SOLIDS

369703 To what depth below the surface of sea should a rubber ball be taken as to decrease its volume by \(0.4 \%\) [density of sea water \( = 1000\;kg\;{m^{ - 3}}\) Bulk modulus of rubber \( = 9 \times {10^8}N{m^{ - 2}},{\rm{ }}\left. {g = 10\;m/{s^2}} \right]\)

1 \(5 \times {10^2}\;m\)
2 \(30 \times {10^6}\;m\)
3 \(40 \times {10^6}\;m\)
4 \(36 \times {10^1}\;m\)
PHXI09:MECHANICAL PROPERTIES OF SOLIDS

369704 The bulk modulus of water if its volume changes from 100 litre to 99.5 litre under a pressure of \(100 \mathrm{~atm}\) is (Take ; \(1\,atm = {10^5}N{m^{ - 2}}\))

1 \(2 \times {10^7}\;N\;{m^{ - 2}}\)
2 \(2 \times {10^8}\;N\;{m^{ - 2}}\)
3 \(2 \times {10^9}\;N\;{m^{ - 2}}\)
4 \(2 \times {10^{10}}\;N\;{m^{ - 2}}\)
PHXI09:MECHANICAL PROPERTIES OF SOLIDS

369705 A uniform cube is subjected to volume compression. If each side is decreased by \(1 \%\), then bulk strain is

1 0.01
2 0.06
3 0.02
4 0.03
PHXI09:MECHANICAL PROPERTIES OF SOLIDS

369706 An increase in pressure required to decreases the 200 liters volumes of a liquid by \(0.004 \%\) in container is:

1 \(188\,kPa\)
2 \(8.4\,kPa\)
3 \(18.8\,kPa\)
4 \(84\,kPa\)