For $x element of R Lt subscript x not stretchy rightwards arrow straight infinity end subscript space open parentheses fraction numerator x minus 3 over denominator x plus 2 end fraction close parentheses to the power of x equals$

$Lt subscript h not stretchy rightwards arrow 0 end subscript space fraction numerator f open parentheses 2 h plus 2 plus h squared close parentheses minus f left parenthesis 2 right parenthesis over denominator f open parentheses h minus h squared plus 1 close parentheses minus f left parenthesis 1 right parenthesis end fraction$ given that $f to the power of † left parenthesis 2 right parenthesis equals 6 text and end text f to the power of † left parenthesis 1 right parenthesis equals 4$

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

$Lt subscript h not stretchy rightwards arrow 0 end subscript space fraction numerator f open parentheses 2 h plus 2 plus h squared close parentheses minus f left parenthesis 2 right parenthesis over denominator f open parentheses h minus h squared plus 1 close parentheses minus f left parenthesis 1 right parenthesis end fraction$ given that $f to the power of † left parenthesis 2 right parenthesis equals 6 text and end text f to the power of † left parenthesis 1 right parenthesis equals 4$

$Lim subscript x not stretchy rightwards arrow 0 end subscript space fraction numerator x tan space 2 x minus 2 x tan space x over denominator left parenthesis 1 minus cos space 2 x right parenthesis squared end fraction equals$

If $f left parenthesis a right parenthesis equals 2 comma f to the power of straight prime left parenthesis a right parenthesis equals 1 comma g left parenthesis a right parenthesis equals negative 1 comma g to the power of factorial left parenthesis a right parenthesis equals 2$ , then the value of $Lim subscript x not stretchy rightwards arrow a end subscript space fraction numerator g left parenthesis x right parenthesis f left parenthesis a right parenthesis minus g left parenthesis a right parenthesis f left parenthesis x right parenthesis over denominator x minus a end fraction$ is

Particles of 1gm,1gm,2gm,2gm are placed at the comers A,B,C,D, respectively of a square of side $6 text end text c m$ as shown in figure. Find the distance of centre of mass of the system from geometrical center of square.

If $G left parenthesis x right parenthesis equals negative square root of 25 minus x squared end root$ then $Lim subscript x not stretchy rightwards arrow 1 end subscript space fraction numerator G left parenthesis x right parenthesis minus G left parenthesis 1 right parenthesis over denominator x minus 1 end fraction$ has the value

maths-

If $f left parenthesis x right parenthesis equals square root of fraction numerator x minus sin space x over denominator x plus cos space x end fraction end root$ then $L t f left parenthesis x right parenthesis$ is

maths-General

After the drop detaches its surface energy is

If $ell equals 5 cross times 10 to the power of negative 4 end exponent straight m comma rho equals 10 cubed kgm to the power of negative 3 end exponent equals 10 ms to the power of negative 2 end exponent straight T equals 0.11 Nm to the power of negative 1 end exponent$ the......... radius of the drop when it detaches from the dropper is approximately

$text If end text f left parenthesis 9 right parenthesis equals 9 comma f to the power of apostrophe left parenthesis 9 right parenthesis equals 4 comma text then end text space text Lt end text subscript x not stretchy rightwards arrow 9 end subscript fraction numerator square root of f left parenthesis x right parenthesis end root minus 3 over denominator square root of x minus 3 end fraction text equals end text$

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

$text If end text f left parenthesis 9 right parenthesis equals 9 comma f to the power of apostrophe left parenthesis 9 right parenthesis equals 4 comma text then end text space text Lt end text subscript x not stretchy rightwards arrow 9 end subscript fraction numerator square root of f left parenthesis x right parenthesis end root minus 3 over denominator square root of x minus 3 end fraction text equals end text$

If the radius of the opening of the dropper is $r$ , the vertical force due to the surface tension on the drop of radius $R$ (assuming $r < < R$ ) is:

maths-

$L t subscript x not stretchy rightwards arrow negative straight infinity end subscript open square brackets fraction numerator x to the power of 4 sin space open parentheses 1 over x close parentheses plus x squared over denominator open parentheses 1 plus vertical line x vertical line cubed close parentheses end fraction close square brackets equals$

maths-General

$Lt subscript x not stretchy rightwards arrow straight infinity end subscript open square brackets fraction numerator a to the power of 1 over x end exponent plus b to the power of 1 over x end exponent plus c to the power of 1 over x end exponent over denominator 3 end fraction close square brackets to the power of x$ where a,b,c are real and non-zero=

The basic problem of this indeterminate form is to know from where $f not stretchy left parenthesis x not stretchy right parenthesis$ tends to one (right or left) and what function reaches its limit more rapidly.

$Lt subscript x not stretchy rightwards arrow straight infinity end subscript open square brackets fraction numerator a to the power of 1 over x end exponent plus b to the power of 1 over x end exponent plus c to the power of 1 over x end exponent over denominator 3 end fraction close square brackets to the power of x$ where a,b,c are real and non-zero=

Which graph present the variation of surface tension with temperature over small temperature ranges for coater.

$Lt subscript x not stretchy rightwards arrow straight infinity end subscript space open parentheses fraction numerator x squared plus 5 x plus 3 over denominator x squared plus x plus 2 end fraction close parentheses to the power of x equals$