Since quadrilateral CDEF is inscribed in circle A, the opposite angles are supplementary. This means that:
\[ m\angle FCD + m\angle FED = 180^\circ \]
Substituting the expressions for the angles, we get:
\[ (2x + 5) + (3x - 10) = 180 \]
Now, combine like terms:
\[ 2x + 5 + 3x - 10 = 180 \]
This simplifies to:
\[ 5x - 5 = 180 \]
Next, add 5 to both sides:
\[ 5x = 185 \]
Now, divide by 5:
\[ x = 37 \]
Thus, the value of \( x \) is \(\boxed{37}\).
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