Download [2021] — All Important Derivations Of Physics Class 11 Pdf
To help with your study prep, we have compiled all the derivations mentioned above into a single, structured PDF file.
gh=GM(R+h)2=GMR2(1+hR)2=g(1+hR)-2space g sub h equals the fraction with numerator cap G cap M and denominator open paren cap R plus h close paren squared end-fraction equals the fraction with numerator cap G cap M and denominator cap R squared open paren 1 plus the fraction with numerator h and denominator cap R end-fraction close paren squared end-fraction equals g of open paren 1 plus the fraction with numerator h and denominator cap R end-fraction close paren to the negative 2 power Applying Binomial Theorem for
:a_c = \lim_\Delta t \to 0 \frac{\vert{}\Delta \mathbfv\vert{}}\Delta t = \fracvr \left(\lim_\Delta t \to 0 \frac\vert{}\Delta \mathbfr\vert{}}\Delta t\right) = \fracvr \cdot v = \fracv^2r 3. Banking of Roads
gd=g(1−dR)space g sub d equals g of open paren 1 minus the fraction with numerator d and denominator cap R end-fraction close paren Escape Velocity (
12gT2=(usinθ)Tspace one-half g cap T squared equals open paren u sine theta close paren cap T all important derivations of physics class 11 pdf download
W=∫R∞GMmx2dx=GMm[−1x]R∞=GMmRcap W equals integral from cap R to infinity of the fraction with numerator cap G cap M m and denominator x squared end-fraction d x equals cap G cap M m open bracket negative 1 over x end-fraction close bracket sub cap R raised to the infinity power equals the fraction with numerator cap G cap M m and denominator cap R end-fraction This work is provided by initial kinetic energy:
: Calculating final velocities of two bodies after a 1D elastic collision. Unit 4: Rotational Motion & Gravitation Torque & Angular Momentum : Establishing the relationship
Derive the final velocities of two bodies after a head-on elastic collision. Module 3: Rotational Mechanics and Gravitation Relation between Torque and Angular Momentum: Derive
All chapters are important, but some are derivation-heavy. Chapters like Laws of Motion, Work, Energy, and Power, System of Particles and Rotational Motion, Gravitation, and Thermodynamics consistently have high-weightage derivations in exams. Be sure to prioritize them. To help with your study prep, we have
y=(usinθ)(xucosθ)−12g(xucosθ)2⟹y=xtanθ−gx22u2cos2θspace y equals open paren u sine theta close paren open paren the fraction with numerator x and denominator u cosine theta end-fraction close paren minus one-half g of open paren the fraction with numerator x and denominator u cosine theta end-fraction close paren squared ⟹ y equals x tangent theta minus the fraction with numerator g x squared and denominator 2 u squared cosine squared theta end-fraction (This represents the equation of a parabola). Time of Flight (
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For a streamline flow of an ideal fluid, the sum of pressure energy, kinetic energy, and potential energy per unit volume remains constant.
The story shifts to the currency of the universe: Work and Energy. Work-Energy Theorem: Unit 4: Rotational Motion & Gravitation Torque &
43πr3(ρ−σ)g=6πηrvt⟹vt=2r2(ρ−σ)g9ηfour-thirds pi r cubed open paren rho minus sigma close paren g equals 6 pi eta r v sub t ⟹ v sub t equals the fraction with numerator 2 r squared open paren rho minus sigma close paren g and denominator 9 eta end-fraction Bernoulli’s Principle
As he scrolled, it felt less like studying and more like reading a map. The derivation for Centripetal Acceleration
For a planar body, the moment of inertia about an axis perpendicular to the plane ( Izcap I sub z