Advertisements
Advertisements
Question
Using differential, find the approximate value of the \[\left( 15 \right)^\frac{1}{4}\] ?
Advertisements
Solution
\[\text { Consider the function } y = f\left( x \right) = x^\frac{1}{4} . \]
\[\text{ Let }: \]
\[ x = 16 \]
\[x + ∆ x = 15\]
\[\text { Then }, \]
\[ ∆ x = - 1\]
\[\text { For } x = 16, \]
\[ y = \left( 16 \right)^\frac{1}{4} = 2\]
\[\text { Let }: \]
\[ dx = ∆ x = - 1\]
\[\text { Now }, y = \left( x \right)^\frac{1}{4} \]
\[ \Rightarrow \frac{dy}{dx} = \frac{1}{4 \left( x \right)^\frac{3}{4}}\]
\[ \Rightarrow \left( \frac{dy}{dx} \right)_{x = 16} = \frac{1}{32}\]
\[ \therefore ∆ y = dy = \frac{dy}{dx}dx = \frac{1}{32} \times \left( - 1 \right) = \frac{- 1}{32}\]
\[ \Rightarrow ∆ y = \frac{- 1}{32} = - 0 . 03125\]
\[ \therefore \left( 15 \right)^\frac{1}{4} = y + ∆ y = 1 . 96875\]
APPEARS IN
RELATED QUESTIONS
Using differentials, find the approximate value of the following up to 3 places of decimal
`sqrt(49.5)`
If the radius of a sphere is measured as 7 m with an error of 0.02m, then find the approximate error in calculating its volume.
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
The radius of a sphere shrinks from 10 to 9.8 cm. Find approximately the decrease in its volume ?
A circular metal plate expends under heating so that its radius increases by k%. Find the approximate increase in the area of the plate, if the radius of the plate before heating is 10 cm.
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 loge 4.04, it being given that log104 = 0.6021 and log10e = 0.4343 ?
Using differential, find the approximate value of the \[\sin\left( \frac{22}{14} \right)\] ?
Using differential, find the approximate value of the \[\cos\left( \frac{11\pi}{36} \right)\] ?
Using differential, find the approximate value of the \[\sqrt{26}\] ?
Using differential, find the approximate value of the \[\left( 82 \right)^\frac{1}{4}\] ?
Using differential, find the approximate value of the \[\sqrt{49 . 5}\] ?
Using differential, find the approximate value of the \[\left( 3 . 968 \right)^\frac{3}{2}\] ?
Using differential, find the approximate value of the \[\sqrt{0 . 082}\] ?
Find the approximate value of f (5.001), where f (x) = x3 − 7x2 + 15 ?
For the function y = x2, if x = 10 and ∆x = 0.1. Find ∆ y ?
If y = loge x, then find ∆y when x = 3 and ∆x = 0.03 ?
If the relative error in measuring the radius of a circular plane is α, find the relative error in measuring its area ?
If the percentage error in the radius of a sphere is α, find the percentage error in its volume ?
While measuring the side of an equilateral triangle an error of k % is made, the percentage error in its area is
If loge 4 = 1.3868, then loge 4.01 =
A sphere of radius 100 mm shrinks to radius 98 mm, then the approximate decrease in its volume is
If the ratio of base radius and height of a cone is 1 : 2 and percentage error in radius is λ %, then the error in its volume is
The pressure P and volume V of a gas are connected by the relation PV1/4 = constant. The percentage increase in the pressure corresponding to a deminition of 1/2 % in the volume is
Find the approximate value of f(3.02), up to 2 places of decimal, where f(x) = 3x2 + 5x + 3.
Find the approximate values of : `sqrt(8.95)`
Find the approximate values of : tan–1(0.999)
Find the approximate values of : loge(9.01), given that log 3 = 1.0986.
The approximate value of the function f(x) = x3 − 3x + 5 at x = 1.99 is ____________.
If y = x4 – 10 and if x changes from 2 to 1.99, what is the change in y ______.
Find the approximate value of f(3.02), where f(x) = 3x2 + 5x + 3
If the radius of a sphere is measured as 9 m with an error of 0.03 m. the find the approximate error in calculating its surface area
Find the approximate value of sin (30° 30′). Give that 1° = 0.0175c and cos 30° = 0.866
