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A solution with a pH of 8 has how many times fewer hydrogen ions than a solution with a pH of 6?
pH 8: [H+] = 10^-8 M pH 6: [H+] = 10^-6 M 10^-6 / 10^-8 = 10^2 = 100 Answer is 100 times fewer
What is the pH of a solution with a hydrogen ion H concentration of 10-8 M?
The pH of a solution can be calculated using the formula: pH = -log[H+]. Given the H+ concentration of 10^-8 M, the pH would be 8.
What is the hydroxide-ion concentrations for solutions with 6.00 pH values?
If the pH is 6.00, then the pOH is 8.00 because pH + pOH = 14. pOH = 8.00 = -log[OH-] -8.00 = log[OH-] 10-8.00 = 1 × 10-8 M OH-
What is the pH of resultant solution if solution with pH 3 and pH 8 are mixed?
To find the pH of the resultant solution, you can use the formula: pH = -log[H+]. Calculate the [H+] concentration for each solution using the pH values (pH 3 = 1.0 x 10^-3 M and pH 8 = 1.0 x 10^-8 M) and add them together. Then, convert the total [H+] concentration back to pH using the formula mentioned earlier.
How would you Calculate the H3O ion concentration in a solution with pH3 and a solution with pH8?
In a solution, hydrogen ions normally bond with molecules of water, forming H3O+ (hydronium) ions. Thus, the concentration of the hydronium ions will be the same as the concentration of hydrogen ions, which is related to the pH of a solution according to the following equation: pH = -log[H+] = -log[H3O+] This equation can be solved for the concentration of hydronium ions: [H3O+] = 10-pH Thus, for a solution with a pH of 3, the concentration of hydronium ions will be 10-3 = 0.001 moles/liter, and for a solution with a pH of 8, the concentration of hydronium ions will be 10-8 = 0.00000001 moles/liter.
Is it possible to have an acid solution having strength 0.00000001 M hydrogen ions with a pH of 8?
The pH is define in the following way: pH = -log [H+] What that means is the pH is the negative of the base 10 logarithm of the concentration of hydrogen ions in the solution. So, if you have a pH = 8, that means that the concentration of H+ is equal to 1*10-8 molar, because -log(1*10-8) = 8.And 1*10-8 is equal to 0.00000001, and so if the concentration of H+ is equal to 0.00000001 M, than the pH of the solution is 8 However, a solution with pH = 8 is considered BASIC, not acidic. If the pH is less than 7, it is acidic. If the pH = 7, the solution is neutral, and if the pH is greater than 7, it is considered basic.So the numbers are correct, but the solution is not called acidic.
A solution with a pH of 8 has how many times fewer hydrogen ions than a solution with a pH of 6?
pH 8: [H+] = 10^-8 M pH 6: [H+] = 10^-6 M 10^-6 / 10^-8 = 10^2 = 100 Answer is 100 times fewer
What is the pH of a solution with a hydrogen ion H concentration of 10-8 M?
The pH of a solution can be calculated using the formula: pH = -log[H+]. Given the H+ concentration of 10^-8 M, the pH would be 8.
What is the pH of a solution with a H plus equals 10 -8?
2
What will be the pH if solution of pH 2.32 is diluted 8 times?
This depends on what kind of acid is concerned:for strong acid pH will be increased by (-log(8.0) = ) 0.90, but with a weak acid this will be only 0.46 (halved value)
When KOH is added to water what does the pH of the water solution do?
Increase pH (water) = 7 pH (KOH solution) is about 8 - 10
What is the hydroxide-ion concentrations for solutions with 6.00 pH values?
If the pH is 6.00, then the pOH is 8.00 because pH + pOH = 14. pOH = 8.00 = -log[OH-] -8.00 = log[OH-] 10-8.00 = 1 × 10-8 M OH-
What is the pH of resultant solution if solution with pH 3 and pH 8 are mixed?
To find the pH of the resultant solution, you can use the formula: pH = -log[H+]. Calculate the [H+] concentration for each solution using the pH values (pH 3 = 1.0 x 10^-3 M and pH 8 = 1.0 x 10^-8 M) and add them together. Then, convert the total [H+] concentration back to pH using the formula mentioned earlier.
How would you Calculate the H3O ion concentration in a solution with pH3 and a solution with pH8?
In a solution, hydrogen ions normally bond with molecules of water, forming H3O+ (hydronium) ions. Thus, the concentration of the hydronium ions will be the same as the concentration of hydrogen ions, which is related to the pH of a solution according to the following equation: pH = -log[H+] = -log[H3O+] This equation can be solved for the concentration of hydronium ions: [H3O+] = 10-pH Thus, for a solution with a pH of 3, the concentration of hydronium ions will be 10-3 = 0.001 moles/liter, and for a solution with a pH of 8, the concentration of hydronium ions will be 10-8 = 0.00000001 moles/liter.
How many times more acid is a solution with a pH of 4 than a solution of pH of 6?
pH 8: [H+] = 10^-8 M pH 6: [H+] = 10^-6 M 10^-6 / 10^-8 = 10^2 = 100 Answer is 100 times fewer
Does the solution of pH 5 has the same number of H ions as of pH 8?
No, the solution with pH 5 has a higher concentration of H+ ions than the solution with pH 8. pH is a logarithmic scale where each unit represents a 10-fold difference in H+ concentration. So, a decrease in pH from 8 to 5 means the H+ concentration increases by 10^3 times.
PH of solution that has H3O equals 2.1 x 10 to the -8?
1.15 (apex i gotchu)
