Mathematics Β· Topic Cheatsheet
Differential Calculus
28 key results accumulated across 3 chapters.
Derivative β first principles
Ch 1
The limit of the secant gradient as the gap .
Geometric meaning
Ch 1
= slope of the tangent to at that point = instantaneous rate of change.
Notation
Ch 1
All three mean the same derivative.
Worked results (from first principles)
Ch 1
Derivative (first principles)
Ch 1
Meaning
Ch 1
Gradient of the tangent / instantaneous rate of change.
Power rule
Ch 1
Common trap
Ch 1
Differentiable β continuous, but not vice-versa (corners/cusps).
Power Rule
Ch 2
Any real .
Constant multiple
Ch 2
Sum / difference
Ch 2
Chain Rule
Ch 2
Derivative of outer (at inner) Γ derivative of inner.
Product Rule
Ch 2
Quotient Rule
Ch 2
Common derivatives
Ch 2
Product / quotient
Ch 2
Chain rule
Ch 2
Key derivatives
Ch 2
Common trap
Ch 2
Trig derivatives assume x in RADIANS; donβt forget the chain ruleβs inner derivative.
Stationary points
Ch 3
Maxima, minima, inflexions all have zero gradient.
Second derivative test
Ch 3
β minimum (concave up); β maximum (concave down).
Increasing / decreasing
Ch 3
rising; falling.
Point of inflexion
Ch 3
Concavity changes sign.
Optimisation method
Ch 3
1) write quantity, 2) reduce to one variable via a constraint, 3) set , 4) classify with .
Stationary points
Ch 3
2nd derivative: f''>0 min, f''<0 max, =0 test further (inflexion?).
Increasing / concave
Ch 3
f'>0 increasing; f''>0 concave up. Point of inflexion where concavity changes.
Optimisation
Ch 3
Write the quantity in ONE variable, differentiate, set =0, justify max/min, check endpoints.
Common trap
Ch 3
f''(x)=0 does NOT guarantee inflexion β concavity must actually change sign.