Advertisements
Advertisements
Question
Using differential, find the approximate value of the \[\sqrt{37}\] ?
Advertisements
Solution
\[\text { Consider the function y } = f\left( x \right) = \sqrt{x} . \]
\[\text { Let }: \]
\[ x = 36 \]
\[x + ∆ x = 37\]
\[\text { Then }, \]
\[ ∆ x = 1\]
\[\text { For } x = 36, \]
\[ y = \sqrt{36} = 6\]
\[\text { Let }: \]
\[ dx = ∆ x = 1\]
\[\text { Now,} y = \left( x \right)^\frac{1}{2} \]
\[ \Rightarrow \frac{dy}{dx} = \frac{1}{2\sqrt{x}}\]
\[ \Rightarrow \left( \frac{dy}{dx} \right)_{x = 36} = \frac{1}{12}\]
\[ \therefore ∆ y = dy = \frac{dy}{dx}dx = \frac{1}{12} \times 1 = 0 . 0833\]
\[ \Rightarrow ∆ y = 0 . 0833\]
\[ \therefore \sqrt{37} = y + ∆ y = 6 . 0833\]
APPEARS IN
RELATED QUESTIONS
Using differentials, find the approximate value of the following up to 3 places of decimal
`(0.999)^(1/10)`
Using differentials, find the approximate value of the following up to 3 places of decimal
`(82)^(1/4)`
Using differentials, find the approximate value of the following up to 3 places of decimal
`(32.15)^(1/5)`
Find the approximate change in the surface area of a cube of side x metres caused by decreasing the side by 1%
If the radius of a sphere is measured as 9 m with an error of 0.03 m, then find the approximate error in calculating in surface area
The approximate change in the volume of a cube of side x metres caused by increasing the side by 3% is
A. 0.06 x3 m3
B. 0.6 x3 m3
C. 0.09 x3 m3
D. 0.9 x3 m3
Show that the function given by `f(x) = (log x)/x` has maximum at x = e.
The normal at the point (1, 1) on the curve 2y + x2 = 3 is
(A) x + y = 0
(B) x − y = 0
(C) x + y + 1 = 0
(D) x − y = 1
Find the approximate value of log10 (1016), given that log10e = 0⋅4343.
Find the approximate change in the volume ‘V’ of a cube of side x metres caused by decreasing the side by 1%.
If y = sin x and x changes from π/2 to 22/14, what is the approximate change in y ?
Find the percentage error in calculating the surface area of a cubical box if an error of 1% is made in measuring the lengths of edges of the cube ?
The pressure p and the volume v of a gas are connected by the relation pv1.4 = const. Find the percentage error in p corresponding to a decrease of 1/2% in v .
The height of a cone increases by k%, its semi-vertical angle remaining the same. What is the approximate percentage increase (i) in total surface area, and (ii) in the volume, assuming that k is small ?
Using differential, find the approximate value of the \[\frac{1}{(2 . 002 )^2}\] ?
Using differential, find the approximate value of the log10 10.1, it being given that log10e = 0.4343 ?
Using differential, find the approximate value of the \[\frac{1}{\sqrt{25 . 1}}\] ?
Using differential, find the approximate value of the \[\sqrt{0 . 48}\] ?
Using differential, find the approximate value of the \[\left( 82 \right)^\frac{1}{4}\] ?
Using differential, find the approximate value of the \[\left( 33 \right)^\frac{1}{5}\] ?
Using differential, find the approximate value of the \[\sqrt{49 . 5}\] ?
Using differential, find the approximate value of the \[{25}^\frac{1}{3}\] ?
If the radius of a sphere is measured as 9 cm with an error of 0.03 m, find the approximate error in calculating its surface area ?
If there is an error of a% in measuring the edge of a cube, then percentage error in its surface is
While measuring the side of an equilateral triangle an error of k % is made, the percentage error in its area is
If y = xn then the ratio of relative errors in y and x is
Find the approximate values of : (3.97)4
Find the approximate values of sin (29° 30'), given that 1° = 0.0175°, `sqrt(3) = 1.732`.
Find the approximate values of : tan–1 (1.001)
Find the approximate values of : loge(101), given that loge10 = 2.3026.
Using differentiation, approximate value of f(x) = x2 - 2x + 1 at x = 2.99 is ______.
Find the approximate value of (1.999)5.
The approximate value of f(x) = x3 + 5x2 – 7x + 9 at x = 1.1 is ______.
Find the approximate value of sin (30° 30′). Give that 1° = 0.0175c and cos 30° = 0.866
Find the approximate value of tan−1 (1.002).
[Given: π = 3.1416]
