The sum of all the roots of the equation is:
- A
- B
- C
- D
The sum of all the roots of the equation is:
Correct answer:C
Standard Method
Given:
Find: The sum of all roots.
Rewrite the equation as
Now solve by cases based on the sign of .
Case I:
Then
So,
Hence,
Among these, only
is valid in this case.
Case II:
Then
So,
Thus,
which is valid in this interval.
Therefore, the roots are and .
Their sum is
Therefore, the correct option is C.
Using sign intervals of the quadratic inside modulus
Given:
Find: The sum of all roots.
First factor the quadratic inside the modulus:
So,
Also, from
the right-hand side must be non-negative. Hence,
So only the intervals and need to be checked.
For , the expression inside modulus is non-negative, so
Hence,
Solving,
Now , but . Therefore only is valid here.
For , the expression inside modulus is negative, so
Then
So the roots are and . Since , only is valid.
Thus the valid roots are and .
The sum of all roots is
Therefore, the correct option is C, that is, .
Students often split the modulus without checking where is positive or negative. This is incorrect because the sign changes over different intervals. First determine the sign of , then solve casewise.
A common mistake is to accept from the quadratic in Case I without verifying the interval condition. This is wrong because each case has its own domain restriction. Always substitute the root back into the interval for that case.
Some students forget that requires , so they do not use . This can lead to checking unnecessary intervals. First ensure the right-hand side of the modulus equation is non-negative.
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