If log x =(1/2) log y = (1/5) log z, the value of x4y3z-2 is:
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If log x =(1/2) log y = (1/5) log z, the value of x4y3z-2 is:
If log10000 x = -1/4, then x is given by: |
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The value of 3-1/2 log3(9) is: |
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loge xy - loge |x| equals to: |
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The value of (loga n) / (logab n) is given by: |
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If (a4 - 2a2b2 + b4)x-1 = (a-b)2x (a+b)-2, then x equals to: |
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If a, b, and c are in geometric progression then loga n, logb n and logc n are in: |
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What is the value of antilog10100? |
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If antilog x 5 = 30, what can you infer about x? |
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Every time x is increased by a given constant number, y doubles and z becomes three times. How will log(y) and log(z) behave as x is increased by the same constant number? |
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x triples every second. How will log2x change every second? |
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