Maths-
General
Easy
Question
can be represented in percentage as:
- 83%
- 83.33%
- 84%
- 80%
The correct answer is: 83.33%
First divide the numerator by denominator
= 0.833
And then convert fraction into percent we multiply it by 100 and divide it by 100.
0.833 ×
= ![fraction numerator 83.33 over denominator 100 end fraction](data:image/png;base64,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)
So 83.33 percent that means 83.33%
Related Questions to study
Physics-
Two holes of unequal diameters d1 and d2
are cut in a metal sheet. If the sheet is heated
![](data:image/png;base64,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)
Two holes of unequal diameters d1 and d2
are cut in a metal sheet. If the sheet is heated
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)
Physics-General
Physics-
Out of the following, in which vessel will the temperature of the solution be higher after the salt is completely dissolved.
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)
Out of the following, in which vessel will the temperature of the solution be higher after the salt is completely dissolved.
![](data:image/png;base64,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)
Physics-General
Physics-
Two substances A and B of equal mass m are heated at uniform rate of 6 cal s–1 under similar conditions. A graph between temperature and time is shown in figure. Ratio of heat absorbed
by them for complete fusion is
![](data:image/png;base64,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)
Two substances A and B of equal mass m are heated at uniform rate of 6 cal s–1 under similar conditions. A graph between temperature and time is shown in figure. Ratio of heat absorbed
by them for complete fusion is
![](data:image/png;base64,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)
Physics-General
Physics-
Which of the substances A, B or C has the highest specific heat ? The temperature vs time graph is shown
![](data:image/png;base64,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)
Which of the substances A, B or C has the highest specific heat ? The temperature vs time graph is shown
![](data:image/png;base64,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)
Physics-General
Physics-
The graph signifies
![](data:image/png;base64,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)
The graph signifies
![](data:image/png;base64,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)
Physics-General
Physics-
A student takes 50gm wax (specific heat = 0.6 kcal/kg°C) and heats it till it boils. The graph between temperature and time is as follows. Heat supplied to the wax per minute and boiling point are respectively
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)
A student takes 50gm wax (specific heat = 0.6 kcal/kg°C) and heats it till it boils. The graph between temperature and time is as follows. Heat supplied to the wax per minute and boiling point are respectively
![](data:image/png;base64,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)
Physics-General
Physics-
Heat is supplied to a certain homogenous sample of matter, at a uniform rate. Its temperature is plotted against time, as shown. Which of the following conclusions can be drawn
![](data:image/png;base64,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)
Heat is supplied to a certain homogenous sample of matter, at a uniform rate. Its temperature is plotted against time, as shown. Which of the following conclusions can be drawn
![](data:image/png;base64,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)
Physics-General
Physics-
Which of the curves in figure represents the relation between Celsius and Fahrenheit temperatures
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAKAAAAB0CAYAAAACYDkUAAANKElEQVR4nO2df2xTVRvHn84XCCGBhaBoNHjZHcJClJbM8MMNu0XpkKidmcg2HRV/pSWYQuaSBScwJnFZlk4DaCS4QSZbNFAlBOeP2c02gyyalrgQXNa1ZMYACVkRNIiS7/uHb/uW0m39cXvP7b3nk9xka+8959mz7z3nuec851wdABCHw4gc1gZwtA0XIIcpXIAcpnABcpjCBchhChcghylcgBymcAFymMIFGENZWRnpdDrq7u6OfDY6Oko6ne62w+PxMLRSPXABRuHxeCgvL48AUEdHR+QzURTJ7/cTAAJAJpOJioqKGFurDrgAJ2BkZISIiCwWC/n9fsrLy4t819PTw8os1cEFGEVRUVGku21qaqLR0VEiotvEx5GW/7A2QGlEt24ej4fy8/MZWqN+dDwbZnJ0Oh253e5IzGez2UgQBKqrq2NsmTrgLeAUuN1uKi4ujvze1dVFGzduZGiRuuAtIIcp/CEkDsFgkLUJmoELMIZQKEQlJSWszdAMXIAxtLW1UTAYpF27drE2RRPwGDCKUChEBoOBgsEgCYJAgUCAtUmqh7eAUXR0dJDD4SAiIqfTSW1tbYwtUj98GCYKvV5PRqMx8nNubi5ji9QP74LjoNPpiLtFHngXzGEKFyCHKVyAHKZwAXKYoikBNjY2SjbA3NfXx2dMJEBTAqypqaHR0VESRZGOHDmSUhnBYJC2bdtGL7/8Mj377LMSW6hBoEG+/fZbPPbYY3jiiSfg8Xju+D6eW8bHx2G32yEIAhwOB8bHx+UwVfVoUoBhPvroI9x33314/fXX8dtvv0U+jxWgy+WCIAgwGo0IBAJym6lqNC1AAPjzzz9RV1eHmTNn4r333gPwfwG6XC7o9XoYjUZ4vV6WZqoWzQswzNDQECoqKrB06VIQEe9uZYJPxUURCoVo06ZNdOLECXrooYfo448/pscff5y1WapGU0/BkxEeVvn999+JiMhqtZLZbCa73U6hUIixdSqGdRPMGq/XC7PZDL1eD6fTCeD/MeCVK1ewdetWzJ07Fx988AFLM1WLZgU42bBK7H05ODiI9evXo7CwECdPnpTbVFWjOQGOj4+jvb0dgiDAYrHEfcCYqGPo7u5GQUEBNmzYgHPnzmXaVE2gKQEmOqwyVWSyd+9ezJgxA/X19bhx44bUZmoKTQjQ6/XCYrFAr9ejvb19yvMTCY3Hxsbw6quv4v7778fBgwfTss9qtYKIQERobm5Oq6xsQzECjP4nWK1WScpMdfosmWez/v5+lJaWori4GL29vUnb6Ha7IYoiAMDv9ydVtxpQxF8b63gigt/vT6tMp9MJQRBgNpuTnj5LRQTRcWWq03Vutxsmkymla7MVRQgwmubm5rRaQCmmz1Jthf755x80NDQgJycHjY2NSV0riqIkN162oSgBiqKYcgwU7m5zc3PhcDjSsiPdbnB4eBjV1dXIz89HZ2dnUteKoqgpESpCgG63OxL/hY+urq6Ers1EmpRUcVhPTw9WrVqFtWvXYmBgIO45sS0+EcHtdktSfzagCAGmSqbSpKR+EDhw4ADmz58Pq9WKixcvxq0v2RtPLWSlAF0uF4xGI4xGI1wul+TlZ+JJ9Nq1a6itrcWsWbPQ0tIiefnZSlYJUK6s5EwOhZw9exbPPfccHn74YRw7dixj9WQLWSHA8fFxOBwOCIIAu92e8fw8OcbinE4n9Ho9zGazppNdFS9AFlnJcg4Gt7a2Yvbs2di+fTuuXr0qW71KQbECjJcmJRdyz0ZcvnwZW7Zswbx587Bv3z5Z62aN4gSohNVnrKbDzpw5g3Xr1mHFihU4deoUExvkRjECDKdJ6fX6tKazpID1fOzRo0exePFiVFZW4vz580xtyTSKEKDSVp+xFmCYpqYmTJs2DTt27MDNmzdZm5MRmHo6EAjAYrFAEISE0qTkQikCBIALFy5g8+bNWLBgAQ4dOsTaHMm5w9O7d+/Gzp07M1qpEuK8yVCSAMNkevA9mnA4lGkdAHEEGAgE8NJLLyEvLw9HjhyRvMJs2GVAiQIMc+jQISxYsACbN2/GhQsXJC9f7nBoQk9/8803k+6fkixKi/MmQ8kCBICbN29ix44dmDZtGpqamiQpMxAI3NYrycWUnp5o/5REUXp3Gw+lCzDM+fPnUVlZicWLF+Po0aMplcH6/5OQp//444/I/imJ5uux/sPSIVsEGObUqVNYsWIF1q1bhzNnziR8nRLCoaQ8/fPPP0f2T/n8888nPC+butt4ZJsAw+zbtw/z5s3Dli1bcPny5QnPk/L/YzKZbksjC/8ee0yUZJuSp7/88kssX74czzzzDH766afI5y6XC2azGUajUfbpMynJVgECwNWrV7F9+3bMnj0bra2tt32XSq/k9Xpht9vjfud2uyPJtNFrWWKzuidb55KWpx0OB+bMmQOr1Qqr1ZqV3W08slmAYaLn0js7O9MKh7xeb2THsGiiBRi9si/8cyJQvOaSH/yY6MjNzb0tXoztgmOXV0y1wCzlWz02jhgcHMRTTz2FRx99NOv3TyFSVwvodDrR0tKCWbNmoba2FteuXUu6LEEQsHPnzilbz+bm5qQWliXt6anSpLq7u7FkyRK88MILWbt/SjYLcLI47+LFi7BarZg/fz4OHDiQUHmBQCCpbttkMiW1qCphTycbwL777ruYPn066uvr8ddffyVskBLIRgEmsulSmIGBAaxduxarVq1CT0+PZDZEd72JLi2d0tPppEmNjY3hlVdewQMPPJD2/ilykm0CTHVYpbOzE/n5+aiursbw8HAGLZyYST0t1XhRX18fSkpKsGbNGnz//fcplyMX2SJAqbLGGxsbkZOTg4aGBty6dUtCC6cmrqczNS/4ySef4MEHH4TFYkEwGJSsXKlRugAzMcsUCASwadMm2VPj7vB0ePVZpsbz/v77b7z99tu46667sGfPHsnLlwIlCzCdTZcSobe3F8XFxSgtLZUlG/sOT3u9XlnmBX/55RdUVVVh0aJF+PTTTzNeXzIoUYByT28ePHgQX3zxRcbrYe7pr776CitXrkRZWRlOnz7N2hwAyhKglJsuKRHFeHr//v24++67YbPZcOnSJaa2KEGA2ZxNlAyKeU+IzWYjv99PM2fOpPz8fGptbWVtEjP6+vrIYDCQz+cjl8tFdrudcnNzWZuVGVjfAfHw+Xwwm81YtmwZjh8/Lnv9rNwi57oPpaBIAYY5fvw4HnnkEZSXl8Pn88lWr9wC1Ep3Gw/FdMHxKC8vp7Nnz9Lq1aupqKiIamtr6fr166zNkoxQKES7du0ig8FAc+bMIa/Xq+7uNh6s74BEuXTpEqxWK+655x7s378/o3XJ4ZZszxqXiqwRYJiBgQGYTCasXLlS0on0aDIpQJabLimRrBNgmM7OTixatAhVVVWST6RnQoBajvMmQ1ExYFlZGdlstoTOra6upuHhYVqyZAkVFBTQO++8Q7du3cqwhckTCoWoo6ODDAYDhUIh9Q+rJIliBJio8GJpaGigkZERGhsbI1EUqaOjQ2LLUif8DuLDhw+T0+mk9vZ2EgQhoWttNht5PJ4MW6gAWDfBANDV1YWurq60X1LT29uLNWvWoLS0FP39/SmXk65bwu+mSyWzJPzWKCJtvK6BeQs4OjpKP/zwA23cuDHtskpLS6m/v58qKyupqqqKXnvtNfr1118lsDIxQqEQbdu2jcrLy2nZsmXk9XrJYrEkVUZeXh4BIFEUM2SlwmB9BzQ3N9+x8kqKlxXeuHED9fX1mDFjBvbu3ZvUtam4RepdBkRR1EQLyFyA0aTbBcfj3Llz2LBhAwoKCtDd3Z3QNckIUOrxvOgumEj9L65RvQDDnDx5EoWFhVi/fj0GBwcnPTcRAfJhFWlQlADl4P3338fcuXOxdetWXLlyJe45kwmQC09amD+EyM2bb75Jfr+fcnJySBRFamtrS/ja8LCKz+cjp9PJx/OkgPUdwJIff/wRTz/9NJYvX44TJ05EPo91i1o2XVIimhZgmM8++wxLly5FRUUFhoaGIgLk3W3m0VwXHI/nn3+ehoaGqLCwkAoLC4mIqKWlhQwGAxGRNtOkZEIH/LtFFudfjh07RhUVFTR9+nSqq6ujPXv2sDZJ1fAW8H/4fD4qLy+npqYmIiLq7e2l06dPU1FREX333XeMrVMxrGMA1sSL86LdcvjwYSxcuBA1NTUJb7jDSRzNtoDhNKmSkpJJ06RqamrI7/eTIAgkiiLt3r2bkcUqhfUdwIKpps8mcsvIyAhefPFFiKKYkZf4aBFNCTC86dJUuwxMdV9+/fXXWL16NZ588klJXuKjZTQhwGTH8xLtGD788EPce++9eOONN1J6iQ9HAwJMJU0qmcjk+vXreOutt7Bw4cJUTdQ0qh8H7OvrIyIio9GY8DU6nY5U7hbFoHoBpgIXoHxodhiGowy4ADlM4QLkMIULkMMULkAOU7gAOUzhAoyD3W5nbYJm4OOAHKbwFpDDFC5ADlO4ADlM4QLkMOW/onQ28UkKsEIAAAAASUVORK5CYII=)
Which of the curves in figure represents the relation between Celsius and Fahrenheit temperatures
![](data:image/png;base64,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)
Physics-General
Physics-
A solid substance is at 30°C. To this substance heat energy is supplied at a constant rate. Then temperature versus time graph is as shown in the figure. The substance is in liquid state for the portion (of the graph)
![](data:image/png;base64,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)
A solid substance is at 30°C. To this substance heat energy is supplied at a constant rate. Then temperature versus time graph is as shown in the figure. The substance is in liquid state for the portion (of the graph)
![](data:image/png;base64,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)
Physics-General
Physics-
The figure given below shows the cooling curve of pure wax material after heating. It cools from A to B and solidifies along BD. If L and C are respective values of latent heat and the specific heat of the liquid wax, the ratio L/C is
![](data:image/png;base64,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)
The figure given below shows the cooling curve of pure wax material after heating. It cools from A to B and solidifies along BD. If L and C are respective values of latent heat and the specific heat of the liquid wax, the ratio L/C is
![](data:image/png;base64,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)
Physics-General
Physics-
The portion AB of the indicator diagram representing the state of matter denotes
![](data:image/png;base64,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)
The portion AB of the indicator diagram representing the state of matter denotes
![](data:image/png;base64,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)
Physics-General
Physics-
The graph shows the variation of temperature (T) of one kilogram of a material with the heat (H) supplied to it. At O, the substance is in the solid state. From the graph, we can conclude that
![](data:image/png;base64,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)
The graph shows the variation of temperature (T) of one kilogram of a material with the heat (H) supplied to it. At O, the substance is in the solid state. From the graph, we can conclude that
![](data:image/png;base64,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)
Physics-General
Physics-
The graph AB shown in figure is a plot of temperature of a body in degree celsius and degree Fahrenheit. Then
![](data:image/png;base64,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)
The graph AB shown in figure is a plot of temperature of a body in degree celsius and degree Fahrenheit. Then
![](data:image/png;base64,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)
Physics-General
Physics-
In a vertical U-tube containing a liquid, the two arms are maintained at different temperatures
and
. The liquid columns in the two arms have heights
and
respectively. The coefficient of volume expansion of the liquid is equal to
![](data:image/png;base64,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)
In a vertical U-tube containing a liquid, the two arms are maintained at different temperatures
and
. The liquid columns in the two arms have heights
and
respectively. The coefficient of volume expansion of the liquid is equal to
![](data:image/png;base64,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)
Physics-General
Physics-
A cylindrical metal rod of length L0 is shaped into a ring with a small gap as shown. On heating the system
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)
A cylindrical metal rod of length L0 is shaped into a ring with a small gap as shown. On heating the system
![](data:image/png;base64,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)
Physics-General