Physics, asked by jayan123, 6 months ago

The length and breadth of a rectangular sheet
are 16.2 cm and 10.1 cm, respectively. The area of
the sheet in appropriate significant figures and
error is
(a) 164 + 3 cm
(b) 163.62 2.6 cm
(c) 163.6 2.6 cm
(d) 163.62 + 3 cm​

Answers

Answered by bhaktihbalwadkar
0

Answer:

Error in product of quantities: Suppose x=a×b

Let Δa=absolute error in measurement of a,

Δb=absolute error in measurement of b,

Δx=absolute error in calculation of x, i.e. product of a and b.

The maximum fractional error in x is

x

Δx

=±(

a

Δa

+

b

Δb

)

Percentage error in the value of x=(Percentage error in value of a)+(Percentage error in value of b)

According to the problem, length l=(16.2±0.1)cm

Breadth b=(10.1±0.1)cm

Area A=l×b=(16.2cm)×(10.1cm)=163.62cm

2

As per the rule area will have only three significant figures and error will have only one significant figure.Rounding off we get,area A=164cm

2

If ΔA is error in the area, then relative error is calculated as

A

δ4

.

A

Δ4

=

l

Δl

+

b

Δb

=

16.2cm

0.1cm

+

10.1cm

0.1cm

=

16.2×10.1

1.01+1.62

=

163.62

2.63

⇒ΔA=A×

163.62

2.63

cm

2

=162.62×

163.62

2.63

=2.63cm

2

ΔA=3cm

2

(By rounding off to one significant figure)

Area, A=A±ΔA(164±3)cm

2

Answered by mdmehedihasantanzid
0

Answer:

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