We need two consecutive integers (n) and (n + 1) who have
a product = 72
Setup relational equation:
We need to find two integers, n and n + 1 who have a product of 72 n * (n + 1) = 72
Multiplying through, we get n2 + n = 72
Rearranging the equation we get n2 + n - 72 = 0
Now that it is in Quadratic Format, determine a, b, and c:
a = 1, b = 1, and c = -72
Solution 1 = ½(-b + √b2 - 4ac)
Solution 1 = ½(-1 + √12 - 4 * 1 * -72)
Solution 1 = ½(-1 + √1 - -288)
Solution 1 = ½(-1 + √289)
Solution 1 = ½(-1 + 17)
Solution 1 = ½(16)
Solution 1 = 8
Determine Answers:
Solution 2 = Solution 1 + 1
Solution 2 = 8 + 1
Solution 2 = 9
Also, since the product of 2 negative #'s is positive, another solution is:
Solution 3 = (-1 * 8) * (-1 * 9)
Solution 3 = -1 * 8
Solution 3 = -8
Solution 4 = -1 * 9
Solution 4 = -9
Final Answers:
8, 9, -8, -9
You have 2 free calculationss remaining
What is the Answer?
8, 9, -8, -9
How does the Consecutive Integer Word Problems Calculator work?
Free Consecutive Integer Word Problems Calculator - Calculates the word problem for what two consecutive integers, if summed up or multiplied together, equal a number entered. This calculator has 1 input.
What 2 formulas are used for the Consecutive Integer Word Problems Calculator?
n + (n + 1) = Sum of Consecutive Integers n(n + 1) = Product of Consecutive Integers