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that you have a zero on the other side of the equals to sign. Now the formula to calculate the roots of the quadratic equation ax*x + bx + c = 0 is x = (-b + root of(b*b - 4*a*c) ) / 2 * a. The other root can be obtained by using the minus sign before the .....
Calculate the horizontal asymptotes of the equation using the following rules: 1) If the degree of the numerator is higher than the degree of the denominator, there are no horizontal asymptotes; 2) if the degree of the denominator is higher, the horizontal asymptote is y = 0; 3) if the ...
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Now that we have a better understanding of the difference quotient and what it is used for, let's learn how to calculate the difference quotient for various functions. Below is a list of steps that can be useful when calculating the difference quotient. Step 1: Find f(x+h). Complete thi...
Horizontal asymptotes are the numbers that "y" approaches as "x" approaches infinity. For instance, as "x" approaches infinity and "y" approaches 0 for the function "y=1/x" -- "y=0" is the horizontal asymptote. You can save time in finding horizontal asy
Example 1:To find the domain of a function f(x) = √(x + 3), we apply the rule 2 mentioned above. Then we get: x + 2 ≥ 0. Solving thisinequality, we get x ≥ -2. Thus, the domain of f(x) is [-2, ∞). Example 2:To calculate the domain of a function g(x) = (...
I built off of this answer, modifying to calculate the sum of the instances of the highest number (well, the product of its count with its value, same thing) then divide by the amount of dice - getting, as a result, the 'average contribution of each die', or so I thin...