Let the system of equations where , have infinitely many solutions. Then the number of the solutions of this system, if are integers and satisfy , is:
- A
- B
- C
- D
Let the system of equations where , have infinitely many solutions. Then the number of the solutions of this system, if are integers and satisfy , is:
Correct answer:A
Standard Method
Given:
with , and the system has infinitely many solutions.
Find: The number of integer solutions satisfying .
For infinitely many solutions, the third equation must be a linear combination of the first two equations. Assume
Comparing coefficients,
and for constants,
From
we get
Substitute into
so
Hence,
Now,
and
So the dependent system becomes
Use the first two equations to express the integer solutions. From the first equation,
Substitute into the second equation:
Then
Thus all integer solutions are
where . Now,
Given
so
Since is an integer,
Therefore, the number of integer solutions is . Hence, the correct option is A.
Parameter Form and Counting
The solution states that the correct option is A and derives the dependence condition for infinitely many solutions.
First determine the values of the parameters:
Then solve the reduced pair of independent equations:
From the first equation,
Substitute into the second equation:
Then
So the integer solution set is parametrized by integer as
Now compute the required sum:
Apply the condition
This gives
Hence the integer values possible are
Thus there are exactly integer triples satisfying the condition.
Therefore, the correct option is A.
Assuming that infinitely many solutions only means the determinant is . This is incomplete because the system must also be consistent, so the third equation must match the same linear dependence as the first two including the constant term. Check both coefficients and constants.
Finding correctly but forgetting to compute from the same linear combination. That would make the system inconsistent instead of dependent. After obtaining the multipliers, apply them to the right-hand sides as well.
Solving the two independent equations but not writing the full integer parametric form. The count depends on the expression for in terms of the integer parameter. Express all three variables in one parameter before applying the inequality.
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