Say you’ve learnt math in your native language which is not English. Since then you’ve also read math in English and you appreciate the near universality of mathematical notation. Then one day you want to discuss a formula in real life and you realize you don’t know how to pronunce “an”.
Status: I had little prior knowledge of the topic. This was mostly generated by ChatGPT4 and kindly reviewed by @TheManxLoiner.
General
Distinguishing case
F,δ
“Big F” or “capital F”, “little delta”
Subscripts
an
“a sub n” or, in most cases, just “a n”
Calculus
Pythagorean Theorem
a2+b2=c2
“a squared plus b squared equals c squared.”
Area of a Circle
A=πr2
“Area equals pi [pronounced ‘pie’] r squared.”
Slope of a Line
m=y2−y1x2−x1
“m equals y 2 minus y 1 over x 2 minus x 1.”
Quadratic Formula
x=−b±√b2−4ac2a
“x equals minus b [or ‘negative b’] plus or minus the square root of b squared minus four a c, all over two a.”
Sum of an Arithmetic Series
S=n2(a1+an)
“S equals n over two times a 1 plus a n.”
Euler’s Formula
eiθ=cos(θ)+isin(θ)
“e to the i theta equals cos [pronounced ‘coss’ or ‘coz’] theta plus i sine theta.”
Law of Sines
sin(A)a=sin(B)b=sin(C)c
“Sine A over a equals sine B over b equals sine C over c.”
Area of a Triangle (Heron’s Formula)
A=√s(s−a)(s−b)(s−c), where s=a+b+c2
“Area equals the square root of s times s minus a times s minus b times s minus c, where s equals a plus b plus c over two.”
Compound Interest Formula
A=P(1+rn)nt
“A equals P times one plus r over n to the power of n t.”
Logarithm Properties
logb(xy)=logb(x)+logb(y)
Don’t state the base if clear from context: “Log of x y equals log of x plus log of y.”
Otherwise “Log to the base b of x y equals log to the base b of x plus log to the base b of y.”
More advanced operations
Derivative of a Function
dfdx or ddxf(x) or f′(x)
“df by dx”, or “d dx of f of x”, or “f prime of x” or “f dash of x”.
Second Derivative
d2dx2f(x) or f′′(x)
“d squared dx squared of f of x” or “f double prime of x.”
Partial Derivative (unreviewed)
∂∂xf(x,y)
“Partial with respect to x of f of x, y.”
Definite Integral
∫baf(x)dx
“Integral from a to b of f of x dx.”
Indefinite Integral (Antiderivative)
∫f(x)dx
“Integral of f of x dx.”
Line Integral (unreviewed)
∫Cf(x,y)ds
“Line integral over C of f of x, y ds.”
Double Integral
∫ba∫dcf(x,y)dxdy
“Double integral from a to b and c to d of f of x, y dx dy.”
Gradient of a Function
∇f
“Nabla f” or “del f”, or “gradient of f” or “grad f” to distinguish from other uses such as divergence or curl.
Divergence of a Vector Field
∇⋅F
“Nabla dot F” or “div F”.
Curl of a Vector Field
∇×F
“Nabla cross F” or “curl F”.
Laplace Operator
Δf or ∇2f
“Delta f” or “Laplacian of f”, or “nabla squared f” or “del squared f”.
Limit of a Function
limx→af(x)
“Limit as x approaches a of f of x.”
Linear Algebra (vectors and matrices)
Vector Addition
v+w
“v plus w.”
Scalar Multiplication
cv
“c times v.”
Dot Product
v⋅w
“v dot w.”
Cross Product
v×w
“v cross w.”
Matrix Multiplication
AB
“A B.”
Matrix Transpose
AT
“A transpose.”
Determinant of a Matrix
|A| or det(A)
“Determinant of A” or “det A”.
Inverse of a Matrix
A−1
“A inverse.”
Eigenvalues and Eigenvectors
λ for eigenvalues, v for eigenvectors
“Lambda for eigenvalues; v for eigenvectors.”
Rank of a Matrix
rank(A)
“Rank of A.”
Trace of a Matrix
tr(A)
“Trace of A.”
Vector Norm
∥v∥
“Norm of v” or “length of v”.
Orthogonal Vectors
v⋅w=0
“v dot w equals zero.”
With numerical values
Matrix Multiplication with Numerical Values
Let A=(1234) and B=(5678), then AB=(19224350).
“A B equals nineteen, twenty-two; forty-three, fifty.”
Vector Dot Product
Let v=(1,2,3) and w=(4,5,6), then v⋅w=32.
“v dot w equals thirty-two.”
Determinant of a Matrix
For A=(1234), |A|=−2.
“Determinant of A equals minus two.”
Eigenvalues and Eigenvectors with Numerical Values
Given A=(2112), it has eigenvalues λ1=3 and λ2=1, with corresponding eigenvectors v1=(11) and v2=(−11).
“Lambda one equals three with v one equals one, one; lambda two equals one with v two equals minus one, one.”
Solving a System of Linear Equations
For the system given by Ax=b, where A=(1234) and b=(511), the solution x can be found using A−1b.
“x equals A inverse b, solving the system.”
Probabilities and Statistics
Probability of an Event
P(A)=number of favorable outcomestotal number of outcomes
“P of A equals the number of favorable outcomes over the total number of outcomes.”
“P A” and “probability of A” are also common.
Mean of a Dataset
μ=1N∑Ni=1xi
“Mu equals one over N times the sum from i equals one to N of x i.”
Sample Mean
¯x=1n∑ni=1xi
“x bar equals one over n times the sum from i equals one to n of x i.”
Standard Deviation of a Population
σ=√1N∑Ni=1(xi−μ)2
“Sigma equals the square root of one over N times the sum from i equals one to N of x i minus mu squared.”
Sample Standard Deviation
s=√1n−1∑ni=1(xi−¯x)2
“s equals the square root of one over n minus one times the sum from i equals one to n of x i minus x bar squared.”
Covariance of Two Variables
Cov(X,Y)=1n−1∑ni=1(xi−¯x)(yi−¯y)
“Covariance of X and Y equals one over n minus one times the sum from i equals one to n of x i minus x bar times y i minus y bar.”
Correlation Coefficient
r=Cov(X,Y)σXσY
“r equals Covariance of X and Y over sigma X times sigma Y.”
Binomial Probability Formula
P(X=k)=(nk)pk(1−p)n−k
“P of X equals k equals n choose k times p to the k times one minus p to the n minus k.”
Central Limit Theorem Approximation
P(a≤X≤b)≈Φ(b−μσ/√n)−Φ(a−μσ/√n)
“Probability of X between a and b approximately equals Phi of b minus mu over sigma divided by the square root of n minus Phi of a minus mu over sigma divided by the square root of n.”
or “P of a less than or equal to X less than or equal to b …”
Logic
Propositional Logic
Negation
Notation: ¬P
English: “Not P.”
Conjunction
Notation: P∧Q
English: “P and Q.”
Disjunction
Notation: P∨Q
English: “P or Q.”
Implication (Conditional)
Notation: P→Q
English: “P implies Q” or “If P then Q.”
Biconditional
Notation: P↔Q
English: “P if and only if Q.”
Predicate Logic
Universal Quantification
Notation: ∀xP(x)
English: “For all x, P of x.”
Existential Quantification
Notation: ∃xP(x)
English: “There exists [an] x such that P of x.”
Modal Logic
Necessity
Notation: □P
English: “Necessarily P.”
Possibility
Notation: ◊P
English: “Possibly P.”
Set Theory
Union and Intersection of Sets with Set Builder Notation
A∪B={x∣x∈A or x∈B}
“A union B equals the set of x such that x is in A or x is in B.”
Function Definition
f:R→R defined by f(x)=x2−2x+1
“f from R to R defined by f of x equals x squared minus two x plus one.”
Cartesian Product and Relations
R={(x,y)∈Z×Z∣x2+y2=25}
“R equals the set of ordered pairs x, y in Z cross Z such that x squared plus y squared equals twenty-five.”
Group Operation
(G,∗) where ∀a,b∈G,a∗b=ab+a+b
“G[, star], where for all a, b in G, a star b equals a b plus a plus b.”
Monoid Example with Identity
(M,⋅) is a monoid if ∃e∈M such that ∀a∈M,a⋅e=e⋅a=a
“M[, dot], is a monoid if there exists e in M such that for all a in M, a dot e equals e dot a equals a.”
Power Set and Subset
P(S)={T∣T⊆S}
“Power set of S equals the set of T such that T is a subset of S.”
Equivalence Relation
a∼b⇔a−b∈Z
“a equivalent to b [or ‘a twiddles b’] if and only if a minus b is in Z.”
Direct Product of Groups
G×H={(g,h)∣g∈G and h∈H}
“G cross H equals the set of ordered pairs g, h such that g is in G and h is in H.”
Vector Space Over a Field
V over F with addition + and scalar multiplication ⋅
Math-to-English Cheat Sheet
Say you’ve learnt math in your native language which is not English. Since then you’ve also read math in English and you appreciate the near universality of mathematical notation. Then one day you want to discuss a formula in real life and you realize you don’t know how to pronunce “an”.
Status: I had little prior knowledge of the topic. This was mostly generated by ChatGPT4 and kindly reviewed by @TheManxLoiner.
General
Distinguishing case
F,δ
“Big F” or “capital F”, “little delta”
Subscripts
an
“a sub n” or, in most cases, just “a n”
Calculus
Pythagorean Theorem
a2+b2=c2
“a squared plus b squared equals c squared.”
Area of a Circle
A=πr2
“Area equals pi [pronounced ‘pie’] r squared.”
Slope of a Line
m=y2−y1x2−x1
“m equals y 2 minus y 1 over x 2 minus x 1.”
Quadratic Formula
x=−b±√b2−4ac2a
“x equals minus b [or ‘negative b’] plus or minus the square root of b squared minus four a c, all over two a.”
Sum of an Arithmetic Series
S=n2(a1+an)
“S equals n over two times a 1 plus a n.”
Euler’s Formula
eiθ=cos(θ)+isin(θ)
“e to the i theta equals cos [pronounced ‘coss’ or ‘coz’] theta plus i sine theta.”
Law of Sines
sin(A)a=sin(B)b=sin(C)c
“Sine A over a equals sine B over b equals sine C over c.”
Area of a Triangle (Heron’s Formula)
A=√s(s−a)(s−b)(s−c), where s=a+b+c2
“Area equals the square root of s times s minus a times s minus b times s minus c, where s equals a plus b plus c over two.”
Compound Interest Formula
A=P(1+rn)nt
“A equals P times one plus r over n to the power of n t.”
Logarithm Properties
logb(xy)=logb(x)+logb(y)
Don’t state the base if clear from context: “Log of x y equals log of x plus log of y.”
Otherwise “Log to the base b of x y equals log to the base b of x plus log to the base b of y.”
More advanced operations
Derivative of a Function
dfdx or ddxf(x) or f′(x)
“df by dx”, or “d dx of f of x”, or “f prime of x” or “f dash of x”.
Second Derivative
d2dx2f(x) or f′′(x)
“d squared dx squared of f of x” or “f double prime of x.”
Partial Derivative (unreviewed)
∂∂xf(x,y)
“Partial with respect to x of f of x, y.”
Definite Integral
∫baf(x)dx
“Integral from a to b of f of x dx.”
Indefinite Integral (Antiderivative)
∫f(x)dx
“Integral of f of x dx.”
Line Integral (unreviewed)
∫Cf(x,y)ds
“Line integral over C of f of x, y ds.”
Double Integral
∫ba∫dcf(x,y)dxdy
“Double integral from a to b and c to d of f of x, y dx dy.”
Gradient of a Function
∇f
“Nabla f” or “del f”, or “gradient of f” or “grad f” to distinguish from other uses such as divergence or curl.
Divergence of a Vector Field
∇⋅F
“Nabla dot F” or “div F”.
Curl of a Vector Field
∇×F
“Nabla cross F” or “curl F”.
Laplace Operator
Δf or ∇2f
“Delta f” or “Laplacian of f”, or “nabla squared f” or “del squared f”.
Limit of a Function
limx→af(x)
“Limit as x approaches a of f of x.”
Linear Algebra (vectors and matrices)
Vector Addition
v+w
“v plus w.”
Scalar Multiplication
cv
“c times v.”
Dot Product
v⋅w
“v dot w.”
Cross Product
v×w
“v cross w.”
Matrix Multiplication
AB
“A B.”
Matrix Transpose
AT
“A transpose.”
Determinant of a Matrix
|A| or det(A)
“Determinant of A” or “det A”.
Inverse of a Matrix
A−1
“A inverse.”
Eigenvalues and Eigenvectors
λ for eigenvalues, v for eigenvectors
“Lambda for eigenvalues; v for eigenvectors.”
Rank of a Matrix
rank(A)
“Rank of A.”
Trace of a Matrix
tr(A)
“Trace of A.”
Vector Norm
∥v∥
“Norm of v” or “length of v”.
Orthogonal Vectors
v⋅w=0
“v dot w equals zero.”
With numerical values
Matrix Multiplication with Numerical Values
Let A=(1234) and B=(5678), then AB=(19224350).
“A B equals nineteen, twenty-two; forty-three, fifty.”
Vector Dot Product
Let v=(1,2,3) and w=(4,5,6), then v⋅w=32.
“v dot w equals thirty-two.”
Determinant of a Matrix
For A=(1234), |A|=−2.
“Determinant of A equals minus two.”
Eigenvalues and Eigenvectors with Numerical Values
Given A=(2112), it has eigenvalues λ1=3 and λ2=1, with corresponding eigenvectors v1=(11) and v2=(−11).
“Lambda one equals three with v one equals one, one; lambda two equals one with v two equals minus one, one.”
Solving a System of Linear Equations
For the system given by Ax=b, where A=(1234) and b=(511), the solution x can be found using A−1b.
“x equals A inverse b, solving the system.”
Probabilities and Statistics
Probability of an Event
P(A)=number of favorable outcomestotal number of outcomes
“P of A equals the number of favorable outcomes over the total number of outcomes.”
“P A” and “probability of A” are also common.
Mean of a Dataset
μ=1N∑Ni=1xi
“Mu equals one over N times the sum from i equals one to N of x i.”
Sample Mean
¯x=1n∑ni=1xi
“x bar equals one over n times the sum from i equals one to n of x i.”
Standard Deviation of a Population
σ=√1N∑Ni=1(xi−μ)2
“Sigma equals the square root of one over N times the sum from i equals one to N of x i minus mu squared.”
Sample Standard Deviation
s=√1n−1∑ni=1(xi−¯x)2
“s equals the square root of one over n minus one times the sum from i equals one to n of x i minus x bar squared.”
Covariance of Two Variables
Cov(X,Y)=1n−1∑ni=1(xi−¯x)(yi−¯y)
“Covariance of X and Y equals one over n minus one times the sum from i equals one to n of x i minus x bar times y i minus y bar.”
Correlation Coefficient
r=Cov(X,Y)σXσY
“r equals Covariance of X and Y over sigma X times sigma Y.”
Binomial Probability Formula
P(X=k)=(nk)pk(1−p)n−k
“P of X equals k equals n choose k times p to the k times one minus p to the n minus k.”
Central Limit Theorem Approximation
P(a≤X≤b)≈Φ(b−μσ/√n)−Φ(a−μσ/√n)
“Probability of X between a and b approximately equals Phi of b minus mu over sigma divided by the square root of n minus Phi of a minus mu over sigma divided by the square root of n.”
or “P of a less than or equal to X less than or equal to b …”
Logic
Propositional Logic
Negation
Notation: ¬P
English: “Not P.”
Conjunction
Notation: P∧Q
English: “P and Q.”
Disjunction
Notation: P∨Q
English: “P or Q.”
Implication (Conditional)
Notation: P→Q
English: “P implies Q” or “If P then Q.”
Biconditional
Notation: P↔Q
English: “P if and only if Q.”
Predicate Logic
Universal Quantification
Notation: ∀xP(x)
English: “For all x, P of x.”
Existential Quantification
Notation: ∃xP(x)
English: “There exists [an] x such that P of x.”
Modal Logic
Necessity
Notation: □P
English: “Necessarily P.”
Possibility
Notation: ◊P
English: “Possibly P.”
Set Theory
Union and Intersection of Sets with Set Builder Notation
A∪B={x∣x∈A or x∈B}
“A union B equals the set of x such that x is in A or x is in B.”
Function Definition
f:R→R defined by f(x)=x2−2x+1
“f from R to R defined by f of x equals x squared minus two x plus one.”
Cartesian Product and Relations
R={(x,y)∈Z×Z∣x2+y2=25}
“R equals the set of ordered pairs x, y in Z cross Z such that x squared plus y squared equals twenty-five.”
Group Operation
(G,∗) where ∀a,b∈G,a∗b=ab+a+b
“G[, star], where for all a, b in G, a star b equals a b plus a plus b.”
Monoid Example with Identity
(M,⋅) is a monoid if ∃e∈M such that ∀a∈M,a⋅e=e⋅a=a
“M[, dot], is a monoid if there exists e in M such that for all a in M, a dot e equals e dot a equals a.”
Power Set and Subset
P(S)={T∣T⊆S}
“Power set of S equals the set of T such that T is a subset of S.”
Equivalence Relation
a∼b⇔a−b∈Z
“a equivalent to b [or ‘a twiddles b’] if and only if a minus b is in Z.”
Direct Product of Groups
G×H={(g,h)∣g∈G and h∈H}
“G cross H equals the set of ordered pairs g, h such that g is in G and h is in H.”
Vector Space Over a Field
V over F with addition + and scalar multiplication ⋅
(spelled out rather than written with symbols)