Kalkulatur tal-Għerq Kwadru
Sib l-għerq kwadru ta' numru u l-forma radikali ssimplifikata tiegħu.
Riżultati aġġornament kif inti tip.
Dwar din il-kalkulatur
the number is a perfect square, such as 36, the root is a whole number (6) and the tool flags it as a perfect square. The square root calculator returns the principal (positive) square root of a number, plus its simplified radical form and whether the number is a perfect square. Enter any non-negative number to see both the decimal value and the exact radical. When the number is itself a perfect square, such as 36, the root is a whole number (6) and the tool flags it as a perfect square. The square root calculator returns the principalSquare rootsSquare roots are found in the Pythagorean theorem, the distance formula, standard deviation and quadratic equationsSquare roots are found in the Pythagorean theorem, the distance formula, standard deviation and quadratic equationsSquare roots are found in the Pythagorean theorem, the distance formula, standard deviation and quadratic equationsSquare roots are found in the Pythagorean theorem, the distance formula, standard deviation and quadratic equationsSquare roots are found in the Pythagorean theorem, the distance formula, standard deviation and quadratic equationsSquare roots are found in the Pythagorean theoremSquare roots are found in the Pythagorean theoremSquare roots are found in the Pythagorean theoremSquare roots are found in the Pythagorean theoremSquare roots are found in the Pythagorean theoremSquare roots are found in the Pythagorean theoremSquare roots are found in the Pythagorean theoremSquare roots are found in the Pythagorean theoremSquare roots are found in the Pythagorean theoremSquare roots are found in the Pythagorean theoremSquare roots are found in the Pythagorean theoremSquare roots are found in the Pythagorean theoremSquare roots are found in the Pythagorean theoremSquare roots are found in the Pythagorean theoremSquare roots are found in the Pythagorean theoremSquare roots are found in
Mistoqsijiet li jsiru ta' spiss
X'inhu radikali simplifikat?
Dan jikteb mill-ġdid għerq billi jiffatturizza l-akbar kwadru perfett. √72 = √(36×2) = 6√2, li huwa eżatt, b'differenza mill-deċimali arrotondat 8.485.
Huwa l-għerq kwadru ta' numru dejjem pożittiv?
Kull numru pożittiv għandu żewġ għeruq kwadri, wieħed pożittiv u wieħed negattiv.Din l-għodda tirritorna l-għerq prinċipali (pożittiv), li huwa r-riżultat standard √.
X'inhu l-għerq kwadru ta 72?
Huwa madwar 8.485, u l-forma eżatta ssimplifikata tiegħu hija 6√2.
X'inhu kwadru perfett?
Numru sħiħ li l-għerq kwadru tiegħu huwa wkoll numru sħiħ, bħal 36 (√36 = 6).L-għodda tgħidlek jekk in-numru tiegħek jikkwalifikax.
Nista’ nieħu l-għerq kwadru ta’ numru negattiv?
Mhux fin-numri reali — inputs negattivi m'għandhomx għerq kwadru reali.Int ikollok bżonn numri kumplessi, fejn √−4 = 2i.
Għaliex juru radikali simplifikata minflok deċimali?
Il-forma radikali hija eżatta, 6√2 hija preċiża, filwaqt li 8.485 hija approssimazzjoni aġġustata li titlef il-preċiżjoni f'kalkoli ulterjuri.
API — uża din il-kalkulatur mill-kodiċi
Sejjaħ dan il-kalkulatur bħala punt aħħari JSON b'xejn — l-ebda ċavetta meħtieġa Ibgħat il-valuri tal-qasam hawn taħt bħala parametri tal-mistoqsija jew JSON. Aqra d-dokumenti sħaħ tal-API →
Punt aħħari
GET https://calculator.free/api/v1/square-root/
curl
curl "https://calculator.free/api/v1/square-root/?value=72"
JavaScript fetch()
const r = await fetch(
"https://calculator.free/api/v1/square-root/?" + new URLSearchParams({
"value": "72"
}));
const data = await r.json();
console.log(data.results);
Ir-riżultati huma stimi għal gwida ġenerali biss, mhux parir finanzjarju, mediku jew tat-taxxa.