5.3 KiB
id | title |
---|---|
math-numbers-tez | Math, Numbers & Tez |
LIGO offers three built-in numerical types: int
, nat
and tez
.
Addition
Addition in LIGO is accomplished by means of the +
infix
operator. Some type constraints apply, for example you ca not add a
value of type tez
to a value of type nat
.
In the following example you can find a series of arithmetic
operations, including various numerical types. However, some bits
remain in comments because they would otherwise not compile because,
for example, adding a value of type int
to a value of type tez
is
invalid. Note that adding an integer to a natural number produces an
integer.
// int + int yields int
const a : int = 5 + 10
// nat + int yields int
const b : int = 5n + 10
// tez + tez yields tez
const c : tez = 5mutez + 10mutez
//tez + int or tez + nat is invalid
// const d : tez = 5mutez + 10n
// two nats yield a nat
const e : nat = 5n + 10n
// nat + int yields an int: invalid
// const f : nat = 5n + 10;
const g : int = 1_000_000
Pro tip: you can use underscores for readability when defining large numbers:
const sum : tez = 100_000mutez
// int + int yields int
let a : int = 5 + 10
// nat + int yields int
let b : int = 5n + 10
// tez + tez yields tez
let c : tez = 5mutez + 10mutez
// tez + int or tez + nat is invalid
// const d : tez = 5mutez + 10n
// two nats yield a nat
let e : nat = 5n + 10n
// nat + int yields an int: invalid
// const f : nat = 5n + 10
let g : int = 1_000_000
Pro tip: you can use underscores for readability when defining large numbers:
let sum : tez = 100_000mutez
// int + int yields int
let a : int = 5 + 10;
// nat + int yields int
let b : int = 5n + 10;
// tez + tez yields tez
let c : tez = 5mutez + 10mutez;
// tez + int or tez + nat is invalid:
// let d : tez = 5mutez + 10n;
// two nats yield a nat
let e : nat = 5n + 10n;
// nat + int yields an int: invalid
//let f : nat = 5n + 10;
let g : int = 1_000_000;
Pro tip: you can use underscores for readability when defining large numbers:
let sum : tex = 100_000mutez;
Subtraction
Subtraction looks like as follows.
⚠️ Even when subtracting two
nats
, the result is anint
const a : int = 5 - 10
// Subtraction of two nats yields an int
const b : int = 5n - 2n
// Therefore the following is invalid
// const c : nat = 5n - 2n
const d : tez = 5mutez - 1mutez
let a : int = 5 - 10
// Subtraction of two nats yields an int
let b : int = 5n - 2n
// Therefore the following is invalid
// const c : nat = 5n - 2n
let d : tez = 5mutez - 1mutez
let a : int = 5 - 10;
// Subtraction of two nats yields an int
let b : int = 5n - 2n;
// Therefore the following is invalid
// let c : nat = 5n - 2n;
let d : tez = 5mutez - 1mutez;
Multiplication
You can multiply values of the same type, such as:
const a : int = 5 * 5
const b : nat = 5n * 5n
// You can also multiply `nat` and `tez` in any order
const c : tez = 5n * 5mutez;
let a : int = 5 * 5
let b : nat = 5n * 5n
// You can also multiply `nat` and `tez` in any order
let c : tez = 5n * 5mutez
let a : int = 5 * 5;
let b : nat = 5n * 5n;
// You can also multiply `nat` and `tez` in any order
let c : tez = 5n * 5mutez;
Division
In LIGO you can divide int
, nat
, and tez
. Here is how:
⚠️ Division of two
tez
values results into anat
const a : int = 10 / 3
const b : nat = 10n / 3n
const c : nat = 10mutez / 3mutez
let a : int = 10 / 3
let b : nat = 10n / 3n
let c : nat = 10mutez / 3mutez
let a : int = 10 / 3;
let b : nat = 10n / 3n;
let c : nat = 10mutez / 3mutez;
From int
to nat
and back
You can cast an int
to a nat
and vice versa. Here is how:
const a : int = int (1n)
const b : nat = abs (1)
let a : int = int (1n)
let b : nat = abs (1)
let a : int = int (1n);
let b : nat = abs (1);
Check if a value is a nat
You can check if a value is a nat
by using a syntax specific
built-in function, which accepts an int
and returns an optional
nat
: if Some(nat)
then the provided integer was indeed a natural
number, and not otherwise.
const is_a_nat : option (nat) = is_nat (1)
let is_a_nat : nat option = Michelson.is_nat (1)
let is_a_nat : option (nat) = Michelson.is_nat (1);