விளக்க எடுத்துக்காட்டு 9.1
x=-2 என்ற புள்ளியில் மேற்கண்ட சார்பின் தன்மையை ஆராய்க.
ஒருபுற எல்லைகள்
[img]data:image/png;base64,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[/img]
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[/img]