Answer :
pH = -log( [H3O+] )
so the pH is in powers of 10
1* 10^ 5 / 1*10^3 = 1* 10^2 = 100
so the answer is:
D. 100 times the original content
so the pH is in powers of 10
1* 10^ 5 / 1*10^3 = 1* 10^2 = 100
so the answer is:
D. 100 times the original content
Answer : The correct option is, (D) 100 times the original content.
Explanation :
As we are given the pH of the solution change. Now we have to calculate the ratio of the hydronium ion concentration at pH = 5 and pH = 3
As we know that,
[tex]pH=-\log [H_3O^+][/tex]
The hydronium ion concentration at pH = 5.
[tex]5=-\log [H_3O^+][/tex]
[tex][H_3O^+]=1\times 10^{-5}M[/tex] ..............(1)
The hydronium ion concentration at pH = 3.
[tex]3=-\log [H_3O^+][/tex]
[tex][H_3O^+]=1\times 10^{-3}M[/tex] ................(2)
By dividing the equation 1 and 2 we get the ratio of the hydronium ion concentration.
[tex]\frac{[H_3O^+]_{original}}{[H_3O^+]_{final}}=\frac{1\times 10^{-5}}{1\times 10^{-3}}=\frac{1}{100}[/tex]
[tex]100\times [H_3O^+]_{original}=[H_3O^+]_{final}[/tex]
From this we conclude that when the pH of a solution changes from a pH of 5 to a pH of 3, the hydronium ion concentration is 100 times the original content.
Hence, the correct option is, (D) 100 times the original content.
