Te tātaitai pūtake tapawhā
Ka kimi i te pūtake tapawhā o tētahi tau me tōna āhua taketake māmā.
Ka whakahōutia ngā hua i te wā e tātuhi ana.
Mo tēnei tātaitai
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. 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. 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. When the number is itself a perfect square, such as 36, the root is a whole number (6) and theSquare rootSquare roots are found in Pythagorean theorem, the distance formula, standard deviation and quadratic equations.Square rootsSquare roots are found in Pythagorean theorem, the distance formula, standard deviation and quadratic equationsSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pythagorean theoremSquare roots are found in Pyth
Ko nga pātai e pā ana
He aha te pūtake ngāwari?
Ka tātuhi anō e ia tētahi pūtake mā te whakawātea i te tapawhā tino pai rawa. √72 = √(36×2) = 6√2, he tika, kāore i te ōrite ki te ira whakarurutanga 8.485.
He tōrunga tonu te pūtake tapawhā o tētahi tau?
E rua ngā pūtake tapawhā o ia tau tōrunga, kotahi tōrunga, kotahi tōraro. Ka hoki tēnei utauta ki te pūtake matua (tōtahi), ko te hua paerewa √.
He aha te pūtake tapawhā o te 72?
Tata ki te 8.485, ā, ko tōna āhua ngāwari tika ko te 6√2.
He aha te tapawhā tika?
Ko tētahi tau tōpū ko tōna pūtake tapawhā he tau tōpū hoki, pēnei i te 36 (√36 = 6). E kī ana te utauta mēnā e tika ana tō tātau tau.
Ka taea e au te mau i te pūtake tapawhā o tētahi tau tōraro?
Kāore i roto i ngā tau tūturu — kāore he pūtake tapawhā tūturu o ngā tāuru tōraro. E hiahiatia ana e koe ngā tau matatini, i reira √−4 = 2i.
He aha te whakaatu i tētahi pūtake māmā i te wāhi o te ira?
He tika te āhua o te pūtake. He tika te 6√2, engari he 8.485 he tātai porohita e ngaro ana te tika i roto i ngā tātaitanga ā muri ake.
API — whakamahi tēnei tātaitai mai i te waehere
E kī ana tēnei tātaitai hei wāhi mutunga kore JSON - kāore he kī e hiahiatia ana. Ka tukuna ngā uara āpure i raro nei hei tohutoro pātai, JSON rānei. Ka pānui te papatono API katoa →
Whakamutunga
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);
Ko ngā hua he whakataunga mō te tohutohu ahuwhānui anake, ehara i te tohutohu moni, rongoā, tāke rānei.