Question

ramu says if log10x=0,value x=0 do you agree with him​

Answer 1

Answer:

Yes because it is the the law of logarithm.

The final solution will become.

log 10x to the base 10=0

10x=10×0

x=0

Hence proved

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Answer 2

Answer:

I disagree with ramu because if $log_{10}x=0$ then,$x=1$

Step-by-step explanation:

The given logarithm is $log_{10}x=0$

Ramu says that if the above logarithm is zero then,the value of x is $x=0$

Let us verify the statement of ramu by using a concept of logarthamic relations.

If the the value for an logarthamic function with a certain base value exists as shown $log_{a}x=b$ then the value of x is base powered to value of logarithm.

Hence it can be written mathematically as $x=a^{b}$

Solving our given logarithm in similar way as shown below

$log_{10}x=0= > x=10^{0}=1\\= > x=1$

The value of x is 1.

Therefore,

I disagree with ramu because if $log_{10}x=0$ then,$x=1$

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