Young's modulus of rubber is $10 to the power of 4 straight N over straight m squared$ and area of cross section is 2 cm² if force of $2 cross times 10 to the power of 5$ dyne is applied along its length then its initial length L becomes….

$L t subscript x not stretchy rightwards arrow 0 end subscript fraction numerator e to the power of x minus sin space x minus 1 over denominator x end fraction$

We can only apply the L’Hospital’s rule if the direct substitution returns an indeterminate form, that means $fraction numerator 0 over denominator 0 space end fraction space o r space fraction numerator plus-or-minus infinity over denominator plus-or-minus infinity end fraction$ '

$L t subscript x not stretchy rightwards arrow 0 end subscript fraction numerator e to the power of x minus sin space x minus 1 over denominator x end fraction$

$Lt subscript x not stretchy rightwards arrow 4 end subscript fraction numerator a to the power of x minus 1 over denominator b to the power of x minus 1 end fraction left parenthesis a greater than 0 comma b greater than 0 comma b not equal to 1 right parenthesis$

We can only apply the L’Hospital’s rule if the direct substitution returns an indeterminate form, that means $0 over 0$ or $fraction numerator plus-or-minus infinity over denominator plus-or-minus infinity end fraction$ .

$Lt subscript x not stretchy rightwards arrow 4 end subscript fraction numerator a to the power of x minus 1 over denominator b to the power of x minus 1 end fraction left parenthesis a greater than 0 comma b greater than 0 comma b not equal to 1 right parenthesis$

PV versus T graph of equal masses of $H subscript 2 end subscript$ , He and $C O subscript 2 end subscript$ is shown in figure Choose the correct alternative

maths-

If $pi less than alpha less than 2 pi$ then $fraction numerator 1 over denominator S i n invisible function application alpha minus square root of c o t to the power of 2 end exponent invisible function application alpha minus c o s to the power of 2 end exponent invisible function application alpha end root end fraction equals$

maths-General

$Lt subscript x not stretchy rightwards arrow 0 end subscript space fraction numerator e to the power of x minus 1 over denominator square root of 1 plus x end root minus 1 end fraction$

$L t subscript x not stretchy rightwards arrow 0 end subscript fraction numerator square root of x plus 1 end root minus 1 over denominator x end fraction$

maths-

If $X equals S i n invisible function application 1 semicolon$ $Y equals S i n invisible function application 2 semicolon$ $Z equals S i n invisible function application 3$ then

maths-General

$Lt subscript x not stretchy rightwards arrow 4 end subscript space fraction numerator square root of x minus 2 over denominator x minus 4 end fraction$

$fraction numerator s i n invisible function application 3 theta over denominator 1 plus 2 c o s invisible function application 2 theta end fraction equals$

Hence Choice 4 is correct

$fraction numerator s i n invisible function application 3 theta over denominator 1 plus 2 c o s invisible function application 2 theta end fraction equals$

Hence Choice 4 is correct

$Lt subscript x not stretchy rightwards arrow 1 end subscript space open square brackets fraction numerator x minus 1 over denominator x squared minus x end fraction minus fraction numerator x minus 1 over denominator x cubed minus 3 x squared plus 2 x end fraction close square brackets$

$L t subscript x not stretchy rightwards arrow 3 end subscript fraction numerator x cubed minus 6 x squared plus 9 x over denominator x squared minus 9 end fraction$

The graph shown in the adjacent diagram, represents the variation of temperature T of two bodies x and y having same surface area, with time (t) due to emission of radiation. Find the correct relation between emissive power(E) and absorptive power(a) of the two bodies

Two circular disc A and B with equal radii are blackened. They are heated to same temperature and are cooled under identical conditions. What inference do you draw from their cooling curves (R is rate of cooling)

A block of steel heated to 100 $degree$ C is left in a room to cool. Which of the curves shown in the figure, represents the correct behaviour