The H3O+ concentration in a solution with pH 3.22 = 1x10^-3.22 M or 6.03x10^-4 M.
If a solution is 100 times less acidic, then the H3O+ concentration will be 6.03x10^-6 M.
Put another way, 100 times less acidic will have a pH of 5.22 and H3O+ = 1x10^-5.22 = 6.03x10^-6M
3 phAnswer:pH is a logarithmic scale. A solution with a pH of 2 has an H+ concentration 1000 times higher than a solution with a pH of 5. Officially pH is the negative logarithm of the molar concentration of the H+ ion in the solution.
No, a pH of 5 is ten times more acidic than a pH o6.
The concentration of H+ has increased 10-fold (10X) compared to what it was at pH 9 and the concentration of OH- has decreased to one-tenth (1/10) what it was at pH 9.
The log to the base 10 of the concentration of Hydrogen ions (H+) in a solution times -1. pH = -log10[H+] This measures the acidity of a solution. A low pH indicates a high concentration of H+(and therefore a low concentration of OH-) which is an acidic solution, and a high pH is found in alkaline solutions (low H+ and high OH-). Neutral is 7 - the pH of water, when there are the same number of H+ ions as OH- ions.
FALSE. It is 100 times more acidic and not 1000 times. PH 4 is more acidic than PH 6. But how many times is the answer to find out. PH = -log 10 [ H+] . Therefore [H+ ] = 10 -PH For PH = 4, [H+] = 10 -4 and for PH = 6, [H+ ] = 10 -6 10 -6 x 100 = 10 -4 therefore PH 4 is 100 times more acidic than PH 6.
About 100 times.
The pH scale represents a count of ions (hydrogen), or more accurately the "activity" of hydrogen ions. The pH is the negative of the logarithm (base 10) of the concentration in moles per liter. A solution with a pH of 4 is 100 times as concentrated as one with a pH of 6.
concentration of H+ increased 10 times what it was at pH7 Remember 1 is acidic 14 is basic, so if the solution goes from 7 to six, it's more acidic
3 phAnswer:pH is a logarithmic scale. A solution with a pH of 2 has an H+ concentration 1000 times higher than a solution with a pH of 5. Officially pH is the negative logarithm of the molar concentration of the H+ ion in the solution.
The water solution having [OH-] = 3.2 X 10-5 has a pOH of 4.495, that is, a pH of 9.505. So, it is a basic solution.
As the pH decreases, the solution becomes 10 times more acidic for each point. A solution of pH 4 is 10 times more acidic than a solution of pH 5. A solution of pH 3 is 10 times more acidic than a solution of pH 4. 10 x 10 = 100 A solution of pH 3 is 100 times more acidic than a solution of pH 5.
No, a pH of 5 is ten times more acidic than a pH o6.
The concentration of H+ has increased 10-fold (10X) compared to what it was at pH 9 and the concentration of OH- has decreased to one-tenth (1/10) what it was at pH 9.
100,000 times more acidic
To first answer this question you must know how the PH scale works. Essentially the PH scale is a logarithmic scale. A logarithmic scale unlike a linear scale (you know the scales that go from 1, 2, 3, etc.) works using exponential increments. For the PH scale every time you go one number down the solution the item in question becomes ten times more acidic than the number above. Therefore to ultimately answer your question a solution with a PH of 1 is ten times more acidic than a solution that has a PH of 2.
100 times
pH = 2 means that the H+ concentration is 0.01 M. pH = 6 means that the H+ concentration is 0.000001 M. So the H+ concentration is 10000 times as great.