
Algebra
1.![src=data:image/png;base64,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2.![src=data:image/png;base64,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]()
Why in the first question There is no distinction between the clockwise and anticlockwise arrangements whereas there is distinction between clockwise and anti clockwise in the second question? So how do we recognise that there is distinction or not? Please answer sir/mam.



