Question

What is the weight (on earth) of a 13.5-gram object?

Answer 1

`0.1323` Newtons `(N)`

`1`(`N`)`=`1`(kg**m)/(s^2)`

Explanation:

The acceleration due to gravity, g, is `9.8` `(m)`/`(s^2)`
Mass, m=`(13.5gm)`**`(1kg)`/`(1000gm)` =`0.0135` `(kg)`

The Weight force is `W=mg` `(N)`
Therefore
`W=`(0.0135`kg`)**(9.8`m/s^2`) =`0.1323` `(N)`

Answer 2

`~~0.132 \ "N"`

Explanation:

Well, weight is expressed through the equation:

`W=mg`

where `m` is the mass of the object in kilograms, `g` is the gravitational acceleration constant, which is around `9.81 \ "m/s"^2`.

So, we first need to convert `13.5 \ "g"` into `"kg"`. Recall that, `1 \ "kg"=1000 \ "g"`, so here, we got:

`13.5 \ "g"=0.0135 \ "kg"`

And so, weight of the object will be

`W=0.0135 \ "kg"*9.81 \ "m/s"^2`

`=0.132435 \ "kg m/s"^2`

But we know that `1 \ "N"= 1 \ "kg m/s"^2`, and so we got:

`=0.132435 \ "N"`

`~~0.132 \ "N"`