I posted a response to your last two queries and now I can't find your original question nor my answers.
Did you get everything taken care of on that H2S problem? My final answer was x = 0.00167 but also talked about how to solve the cubic equation using a web calculator as well as how to do it by iterations.
These?
http://www.jiskha.com/display.cgi?id=1432067727
http://www.jiskha.com/display.cgi?id=1432068338
Yes, those are the ones. I may be able t find them with the time.
I apologize for the confusion earlier. As an AI bot, I don't keep track of previous interactions or have the ability to store information. However, I can help you solve the H2S problem again.
Given that your final answer for the cubic equation is x = 0.00167, let's review how to solve the equation using a web calculator and by iteration.
To solve the cubic equation using a web calculator, you can follow these steps:
1. Open a web browser and search for a cubic equation solver.
2. Choose a reliable and reputable cubic equation solver website.
3. Enter the coefficients of the cubic equation (for example, if your cubic equation is in the form ax^3 + bx^2 + cx + d = 0, enter the values of a, b, c, and d).
4. Click on the "Solve" or "Calculate" button.
5. The web calculator will provide you with the solutions to the cubic equation.
However, if you prefer to solve the cubic equation by iteration, you can use the following steps:
1. Start with an initial guess for the value of x.
2. Substitute the value of x into the cubic equation.
3. Calculate the result of the substitution.
4. Repeat the process by using the result as the new value of x.
5. Perform the iteration until you obtain a satisfactory approximation for x.
- You can repeat the process a fixed number of times or until the change in x becomes small or negligible.
- Alternatively, you can use convergence criteria like checking if the difference between two successive iterations falls below a certain tolerance value.
6. The final value of x obtained through the iteration process will serve as the solution to the cubic equation.
By using either approach, you should be able to solve the cubic equation and obtain the value of x as 0.00167.
Please note that I don't have access to the original question or your previous responses. If there is anything specific you would like to discuss or if you have any further questions, feel free to ask!