Join WhatsApp Icon JEE WhatsApp Group
Question 87

If $$y(x) = (x^x)^x, x > 0$$ then $$\frac{d^2x}{dy^2} + 20$$ at $$x = 1$$ is equal to ______


Correct Answer: 16

Given $$y(x) = (x^x)^x = x^{x^2}$$ for $$x > 0$$, we need to evaluate $$\frac{d^2x}{dy^2} + 20$$ at $$x = 1$$.

Taking the natural logarithm gives $$\ln y = x^2 \ln x$$, and differentiating yields $$\frac{1}{y}\frac{dy}{dx} = 2x \ln x + x$$. Therefore $$\frac{dy}{dx} = y \cdot x(2\ln x + 1) = x^{x^2} \cdot x(2\ln x + 1)$$, and at $$x = 1$$ we have $$y = 1$$ and $$\frac{dy}{dx} = 1\cdot1\cdot1 = 1$$.

To find the second derivative, let $$u = x^{x^2}$$ and $$v = x(2\ln x + 1) = 2x\ln x + x$$ so that $$\frac{dy}{dx} = uv$$. Then $$\frac{du}{dx} = u\cdot(2x\ln x + x) = uv$$ and $$\frac{dv}{dx} = 2\ln x + 3$$, which implies $$\frac{d^2y}{dx^2} = \frac{du}{dx}\,v + u\,\frac{dv}{dx} = uv^2 + u(2\ln x + 3)$$. Evaluating at $$x = 1$$ where $$u = 1$$ and $$v = 1$$ gives $$\frac{d^2y}{dx^2} = 1 + 3 = 4$$.

Using the relation $$\frac{d^2x}{dy^2} = -\frac{\frac{d^2y}{dx^2}}{\bigl(\frac{dy}{dx}\bigr)^3}$$ leads to $$\frac{d^2x}{dy^2} = -\frac{4}{1^3} = -4$$, so $$\frac{d^2x}{dy^2} + 20 = -4 + 20 = 16$$.

The answer is $$16$$.

Get AI Help

Video Solution

video

Create a FREE account and get:

  • Free JEE Mains Previous Papers PDF
  • Take JEE Mains paper tests

JEE Quant Questions | JEE Quantitative Ability

JEE DILR Questions | LRDI Questions For JEE

JEE Verbal Ability Questions | VARC Questions For JEE

Free JEE Topicwise Questions

JEE Rotational MotionJEE Units & MeasurementsJEE Atomic StructureJEE GravitationJEE Periodic Table & PeriodicityJEE StatisticsJEE Inverse Trigonometric FunctionsJEE Magnetism & Magnetic MaterialsJEE Sequences & SeriesJEE MatricesJEE Alternating CurrentsJEE Carboxylic AcidsJEE Permutations & CombinationsJEE Work, Energy & PowerJEE Electromagnetic InductionJEE Electronic DevicesJEE d and f-Block ElementsJEE Chemical KineticsJEE Heat TransferJEE Three Dimensional GeometryJEE Magnetic Effects of CurrentJEE Hydrocarbons - AromaticJEE Electromagnetic WavesJEE Aldehydes & KetonesJEE Hydrocarbons - AlkanesJEE Applications of DerivativesJEE EquilibriumJEE Indefinite IntegrationJEE Chemical ThermodynamicsJEE ElectrochemistryJEE ProbabilityJEE BiomoleculesJEE Continuity & DifferentiabilityJEE Kinetic Theory of GasesJEE Vector AlgebraJEE Hydrocarbons - AlkynesJEE Differential EquationsJEE Current & ResistanceJEE Straight LinesJEE WavesJEE Redox ReactionsJEE Hydrocarbons - AlkenesJEE DeterminantsJEE SolutionsJEE Ray OpticsJEE Dual Nature of Matter & RadiationJEE Chemical Bonding & Molecular StructureJEE Complex NumbersJEE Sets, Relations & FunctionsJEE Electric Charges & FieldsJEE Laws of MotionJEE Fluid MechanicsJEE Basic Concepts in ChemistryJEE Trigonometric FunctionsJEE LimitsJEE Laws of ThermodynamicsJEE Kinematics - 2D MotionJEE p-Block Elements (Groups 13-18)JEE Simple Harmonic MotionJEE Electric Potential & CapacitanceJEE Coordination CompoundsJEE JEE 2D GeometryJEE CirclesJEE Definite IntegrationJEE EMF & Circuit AnalysisJEE Surface TensionJEE Atoms & NucleiJEE Laboratory Experiments - XIJEE Number SystemJEE Basic Principles of Organic ChemistryJEE Wave OpticsJEE Quadratic EquationsJEE Alcohols, Phenols & EthersJEE Organic Compounds with HalogensJEE DifferentiationJEE Conic SectionsJEE Nitrogen-Containing CompoundsJEE ElasticityJEE Practical Organic ChemistryJEE Kinematics - 1D MotionJEE Purification & CharacterisationJEE Binomial Theorem
Ask AI