Question

Differentiate between mass and weight by making a table
( IN YOUR OWN WORDS)

Answer 1

Answer:

The basic difference between mass and weight is that mass is the amount of matter in an object, while weight is the force of gravity by which earth attracts towards it. Mass is the scalar quantity and weight is a vector quantity. The unit of mass is kg while the unit of weight is N. Mass can’t be changed by changing place, weight can be changed by changing the place.

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Answer 2

$\bigstar\:{\underline{\purple{\textsf{\textbf{Difference\:between\:Mass\:and\: Weight\::}}}}}$

$\boxed{\begin{array}{c|cc}\bf Mass&\bf Weight\\\frac{\qquad \qquad \qquad\qquad\qquad \qquad\qquad\qquad}{}&\frac{\qquad \qquad \qquad\qquad\qquad \qquad\qquad\qquad}{}\\\sf Mass \: is \: measure \:of \: the &\sf Weight \: is \: the \: measure \: of \: the \\ \sf \: amount \: of \: matter \: in \:a \: body.&\sf amount \: of \: force \: acting \: on \: mass \\ &\sf due \: to \: acceleration \: due \: to \: gravity. \\\\\sf Mass \: is \: denoted \: by \: 'M'. &\sf Weight \: is \: denoted \: by \: 'W'. \\\\\sf Mass \: is \:a \: scalar \: quantity. &\sf Weight \: is \: a \: vector \: quantity. \\\\\sf Mass = volume \times density&\sf Weight = mass \times acceleration\\ &\sf due \: to \:gravity\\\\\sf The \: SI \: unit \: of \: mass \: is \: &\sf The \: SI \: unit \: of \: weight \: is \:\\\sf Kilogram (Kg).&\sf Newton \: (N).\\\\\sf Mass \: can \: never \: be \: zero. &\sf Weight \: can \: be \: zero \: \\ &\sf where \: there \: is \: no \: gravity. \\\\\sf Mass \: of \: a \: body \: is \: constant &\sf Weight \: varies \: from \: place \: to \\\sf everywhere. & \sf place.\\\\\sf Mass \: can \: be \: easily \: measured &\sf Weight \: can \: be \: measured \: using \\\sf using \: any \: ordinary \: balance.&\sf spring \: balance.\\\\\sf Mass \: is \: a \: fundamental \: physical& \sf Mass \:is \:a \: derived \: quantity\\\sf quantity.\\\\\sf Dimensional \: formula \: of \: mass &\sf Dimensional \: formula \: of \: weight \\\sf is \: M.&\sf is \: [M^1 L^1 T^{-2}]\end{array}}$