Maths-
General
Easy
Question
is equal to
The correct answer is: ![blank to the power of n plus 4 end exponent C subscript r](data:image/png;base64,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)
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For the third resonance, which option shows correct mode shape for displacement variation and pressure variation.
For the third resonance, which option shows correct mode shape for displacement variation and pressure variation.
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Read the vernier
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Read the vernier
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Read the normal screw gauge main scale has only mm marks. Circular scale has 100 division. In complete rotation, the screw advances by 1 mm.
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Read the normal screw gauge main scale has only mm marks. Circular scale has 100 division. In complete rotation, the screw advances by 1 mm.
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If
equal to
If
equal to
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Match Column-I with Column-II and select the correct option from the codes given below.
![](data:image/png;base64,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)
Match Column-I with Column-II and select the correct option from the codes given below.
![](data:image/png;base64,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)
biologyGeneral
biology
Some statements are given below each with one or two blanks. Select the option that correctly fills up the blanks.
i) High concentration of DDT disturbs ___________ in birds, which causes _______.
ii) __________ burns more efficiently as compared to petrol and diesel.
iii) __________ is the natural aging of a lake which occurs due to accumulation of ____________.
iv) _________ reduces the number of organisms which are sensitive to high temperature.
v) Irreparable computers and other electronic goods are known as _________.
Some statements are given below each with one or two blanks. Select the option that correctly fills up the blanks.
i) High concentration of DDT disturbs ___________ in birds, which causes _______.
ii) __________ burns more efficiently as compared to petrol and diesel.
iii) __________ is the natural aging of a lake which occurs due to accumulation of ____________.
iv) _________ reduces the number of organisms which are sensitive to high temperature.
v) Irreparable computers and other electronic goods are known as _________.
biologyGeneral
Maths-
The value of
is
The value of
is
Maths-General