To split the middle term \(-13x\) in the quadratic equation \(x^2 - 13x + 42 = 0\) into two terms, we need to find two numbers that add up to \(-13\) and multiply to \(42\).
Let's denote these two numbers as \(a\) and \(b\). We need:
- \(a + b = -13\)
- \(a \cdot b = 42\)
The factors of \(42\) that also satisfy the sum of \(-13\) can be determined by looking at the pairs of factors of \(42\):
- \(1\) and \(42\)
- \(2\) and \(21\)
- \(3\) and \(14\)
- \(6\) and \(7\)
Now, we can determine which pair of factors, when both are negative, will add up to \(-13\):
- \(-6\) and \(-7\): \(-6 + (-7) = -13\) and \(-6 \cdot -7 = 42\)
Thus, the two numbers that we need to complete the step are \(-6\) and \(-7\).
So, we can rewrite the equation as:
\(x^2 - 6x - 7x + 42 = 0\)
The lesser value first is:
\(-7, -6\)
So the answer is:
\(-7, -6\)
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