Unfortunately, limitations of the browser used by Answers.com means that we cannot see most symbols. It is therefore impossible to give a proper answer to your question. Please resubmit your question spelling out the symbols as "plus", "minus", "equals", "squared", "cubed" etc.
There is no equation since there is no equals sign.
Unfortunately, limitations of the browser used by Answers.com means that we cannot see most symbols. It is therefore impossible to give a proper answer to your question. Please resubmit your question spelling out the symbols as "plus", "minus", "equals", "squared", "cubed" etc.
There is no equation since there is no equals sign.
Unfortunately, limitations of the browser used by Answers.com means that we cannot see most symbols. It is therefore impossible to give a proper answer to your question. Please resubmit your question spelling out the symbols as "plus", "minus", "equals", "squared", "cubed" etc.
There is no equation since there is no equals sign.
Unfortunately, limitations of the browser used by Answers.com means that we cannot see most symbols. It is therefore impossible to give a proper answer to your question. Please resubmit your question spelling out the symbols as "plus", "minus", "equals", "squared", "cubed" etc.
There is no equation since there is no equals sign.
This equation yx3 k is that of a parabola. The variable h and k represent the coordinents of the vertex. The geometrical value k serves to move the graph of the parabola up or down along the line.
5x-y30 = -25
if its the mymaths one type integration into the box!
To find how many numbers between 300 and 400 can be formed from a number plus its reversal, we focus on three-digit numbers of the form (3xy), where (x) and (y) are digits. The reversal of (3xy) is (yx3). The sum, (3xy + yx3), must be calculated. The resulting sum will always produce a number greater than 300. Therefore, any valid (x) and (y) (from 0 to 9) will yield a result in that range. There are 10 possible digits for (x) and 10 for (y), leading to 100 combinations, all of which can be summed to form numbers between 300 and 400.
There should not be any y in the derivative itself since y or y(x) is the function whose derivative you are finding.