Section 1: Definition of derivatives and derivative operations
Type 1: A definition of a derivative
Type 2: Derivative formula for elementary functions
Type 3: Derivative algorithms and compound function differentiation
Type 4: Find the derivative value
Section 2: Tangent Equations for the Use of Derivative Geometric Meanings
Type one: Slope and tilt angle of the tangent of the curve
Type two: Tangent equation at a point
Type 3: Known tangent equations are parameterized
Type 4: Tangent equation at the passpoint
Type 5: The problem of the common tangent of the tangent equation
Type 6: The shortest distance of the tangent equation
Session 3: Using derivatives to study the monotonicity of functions
Type 1: Find the monotonic interval without parameters
Type 2: Use monotonicity to find the parameter range
Type three: Images judged by monotonicity
Type four: Abstract function constructs
Type 5: Monotonic interval discussion with parameters
Section 4: Using Monotonicity to Find Extreme and Maximum Values
Type 1: Extremums and their applications
Type 2: The maximum value and its use
Type three: Use derivatives to study the zero point of a function
Type 4: Zero point to find a little skill
Session 5: Summary of univariate problems in derivatives
Type 1: Permanently established participatory separation
Type 2: Maximum value analysis method established by heng
Type three: Endpoint effect
Type 4: Hidden zeros are false and substitution
Type Five: Guessing the root of the equation
Type 6: The Law of Lopida established by Heng
Test Point 7: Refers to pair isomorphism
Test Point 8: Bump Reversal
Test Point Nine: Common TangentIal Deflation
Test Point 10: Pole Effect
Section 6: Bivariate processing in derivatives
Type 1: Summary of independent bivariate perpetual establishment problems
Exam point 3: Transformation principal method of bivariates
Test Point 4: The Integral Method of Bivariates (Ratio Substitution or Substitution)
Exam point five: Application of Lagrange's median theorem
Section 7: Extremum Point Offset and Inflection Point Offset
Test point 1: Constructing symmetry functions for the offset of extreme points
Test Point 2: Ratio substitution and commutation method of extreme point offset
Type 3: Logarithmic mean inequality of the extremum point offset
Type four: Special form of extreme point offset
Type 5: Extreme point drift
Type 6: Application of Veda's theorem to derivatives
Session 8: Summary of other techniques in derivatives
Type 1: Logarithmic single dogs
Type 2: Index find friends
Type three: Inflection point offset
Type 4: Taylor unfolding style is applied in the college entrance examination
Type 5: Tangent clip for the difference of zero points
Type 6: Secant clip of zero point difference
Type 7: Curve clip of zero difference
Additional: Derivative topics in the past three years of college entrance examination real questions