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Question

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

1
4
0
3

hint Hint:

We can apply L'Hopital's rule, also commonly spelled L'Hospital's rule, whenever direct substitution of a limit yields an indeterminate form. This means that the limit of a quotient of functions (i.e., an algebraic fraction) is equal to the limit of their derivatives.
In this question, we have to find value of $text If end text f left parenthesis 9 right parenthesis equals 9 comma f to the power of apostrophe left parenthesis 9 right parenthesis equals 4 comma text then end text space text Lt end text subscript x not stretchy rightwards arrow 9 end subscript fraction numerator square root of f left parenthesis x right parenthesis end root minus 3 over denominator square root of x minus 3 end fraction text equals end text$ .

The correct answer is: 4

$text If end text f left parenthesis 9 right parenthesis equals 9 comma f to the power of apostrophe left parenthesis 9 right parenthesis equals 4 comma text then end text space text Lt end text subscript x not stretchy rightwards arrow 9 end subscript fraction numerator square root of f left parenthesis x right parenthesis end root minus 3 over denominator square root of x minus 3 end fraction text equals end text$
We first try substitution:
$space text Lt end text subscript x not stretchy rightwards arrow 9 end subscript fraction numerator square root of f left parenthesis x right parenthesis end root minus 3 over denominator square root of x minus 3 end fraction space equals space text Lt end text subscript x not stretchy rightwards arrow 9 end subscript fraction numerator square root of f left parenthesis 9 right parenthesis end root minus 3 over denominator square root of 9 minus 3 end fraction text = end text 0 over 0 text ( Given f(9)=9 ) end text$
Since the limit is in the form 0 over 0, it is indeterminate—we don’t yet know what is it. We need to do some work to put it in a form where we can determine the limit.
$space text Lt end text subscript x not stretchy rightwards arrow 9 end subscript fraction numerator square root of f left parenthesis x right parenthesis end root minus 3 over denominator square root of x minus 3 end fraction text ( Applying Lh rule ; end text fraction numerator d over denominator d x end fraction square root of f left parenthesis x right parenthesis end root text ) = end text fraction numerator 1 over denominator text 2 end text square root of f left parenthesis x right parenthesis end root end fraction f apostrophe left parenthesis x right parenthesis space right parenthesis space text Lt end text subscript x not stretchy rightwards arrow 9 end subscript fraction numerator fraction numerator 1 over denominator text 2 end text square root of f left parenthesis x right parenthesis end root end fraction f apostrophe left parenthesis x right parenthesis over denominator fraction numerator 1 over denominator text 2 end text square root of left parenthesis x right parenthesis end root end fraction end fraction text [ Given end text f apostrophe left parenthesis x right parenthesis space equals 4 text ] end text Lt subscript x not stretchy rightwards arrow 9 end subscript fraction numerator fraction numerator 4 over denominator text 2 end text square root of 9 end fraction over denominator fraction numerator 1 over denominator text 2 end text square root of 9 end fraction end fraction space equals 4$

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

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:

physics-General

General

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

General

Maths-

$Lt subscript x not stretchy rightwards arrow straight infinity end subscript open square brackets fraction numerator a to the power of 1 over x end exponent plus b to the power of 1 over x end exponent plus c to the power of 1 over x end exponent over denominator 3 end fraction close square brackets to the power of x$ 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=

Maths-General

General

physics-

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

physics-General

General

Maths-

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

Maths-General

General

physics-

A soap bubble is blown with the help of a mechanical pump at the mouth-of a tube the pump produces a certain increase per minute in the volume of the bubble irrespective of its internal pressure the graph between the pressure inside the soap bubble and time t will be

physics-General

General

Maths-

$Lt subscript x not stretchy rightwards arrow straight infinity end subscript open parentheses fraction numerator x plus 6 over denominator x plus 1 end fraction close parentheses to the power of x plus 1 end exponent$

Maths-General

General

Maths-

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

Maths-General

General

Maths-

$Lt subscript x not stretchy rightwards arrow straight infinity end subscript space open parentheses fraction numerator x plus a over denominator x plus b end fraction close parentheses to the power of x plus b end exponent equals$

Maths-General

General

maths-

$L t subscript x not stretchy rightwards arrow 0 end subscript fraction numerator e to the power of x minus e to the power of in space x end exponent over denominator 2 left parenthesis x minus sin space x right parenthesis end fraction equals$

maths-General

General

Maths-

$L t subscript x not stretchy rightwards arrow 0 end subscript fraction numerator open parentheses 1 minus e to the power of x close parentheses sin begin display style space end style x over denominator x squared plus x cubed end fraction equals$

Maths-General

General

Maths-

$text If end text a greater than 0 text and end text L subscript x not stretchy rightwards arrow a end subscript fraction numerator a to the power of a minus x to the power of a over denominator x to the power of a minus a to the power of a end fraction equals negative 1 text , then end text bold a equals$

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

$text If end text a greater than 0 text and end text L subscript x not stretchy rightwards arrow a end subscript fraction numerator a to the power of a minus x to the power of a over denominator x to the power of a minus a to the power of a end fraction equals negative 1 text , then end text bold a equals$

Maths-General

General

Maths-

$L subscript x not stretchy rightwards arrow 0 end subscript fraction numerator x left parenthesis 1 plus a cos space x right parenthesis minus b sin space x over denominator x cubed end fraction equals 1 text then end text straight a equals comma straight b equals$

Maths-General

General

physics-

The correct relation is.

physics-General

General

physics-

A vessel whose bottom has round holes with diameter of 0.1 mm is filled with water. The maximum height to which the water can be filled without leakage is
(S.T. of water $== fraction numerator 75 text dyne end text over denominator cm end fraction straight g equals 1000 straight m over straight s squared times$ )

physics-General

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The correct answer is: 4

We first try substitution:Since the limit is in the form 0 over 0, it is indeterminate—we don’t yet know what is it. We need to do some work to put it in a form where we can determine the limit.

Related Questions to study

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:

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:

where a,b,c are real and non-zero=

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.

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

A soap bubble is blown with the help of a mechanical pump at the mouth-of a tube the pump produces a certain increase per minute in the volume of the bubble irrespective of its internal pressure the graph between the pressure inside the soap bubble and time t will be

A soap bubble is blown with the help of a mechanical pump at the mouth-of a tube the pump produces a certain increase per minute in the volume of the bubble irrespective of its internal pressure the graph between the pressure inside the soap bubble and time t will be

The correct relation is.

The correct relation is.

A vessel whose bottom has round holes with diameter of 0.1 mm is filled with water. The maximum height to which the water can be filled without leakage is(S.T. of water )

A vessel whose bottom has round holes with diameter of 0.1 mm is filled with water. The maximum height to which the water can be filled without leakage is(S.T. of water )

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1
4
0
3

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:

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: