Edit page title 10 Isiyingi samahhala semibuzo yesiyingi ukuze uzilolonge | Izibuyekezo zango-2024 - AhaSlides
Edit meta description Indlela yokubala Umjikelezo wombuthano ngokuqondile?

Close edit interface

10 Isiyingi samahhala semibuzo yesiyingi ukuze uzilolonge | 2024 Izibuyekezo

Imibuzo nemidlalo

I-Astrid Tran 22 April, 2024 8 min ifundwe

Indlela yokubala Umjikelezo wombuthano ngokuqondile?

Umjikelezo wombuthano uwulwazi lwezibalo oluyisisekelo noludingekayo olwethulwa esikoleni samabanga aphansi noma esiphakathi. Ukwenza kahle isiyingi somjikelezo kubalulekile kubafundi abahlela ukwenza izifundo zezibalo ezithuthuke kakhulu esikoleni esiphakeme nasekolishi futhi balungiselele izivivinyo ezijwayelekile ezifana neSAT kanye ne-ACT.

I-10 Circumference of a Circle Quiz kulesi sihloko idizayinelwe ukuhlola ukuqonda kwakho kokuthola irediyasi, ububanzi, kanye nesiyingi somjikelezo.

Okuqukethwe:

Ukuzungezwa kwefomula yombuthano

Ngaphambi kokuhlola, ake siphinde sibuyekeze ulwazi olubalulekile!

indlela yokuthola isiyingi esiyindilinga
Ungawuthola kanjani umjikelezo wombuthano

Iyini isiyingi esiyindilinga?

Umjikelezo wendilinga yibanga eliwumugqa wonqenqema lombuthano. Ilingana ne-perimeter yomumo wejometri, nakuba igama elithi umjikelezo lisetshenziselwa amapholygoni kuphela.

Ungawuthola kanjani umjikelezo wombuthano?

Isiyingi sefomula yesiyingi sithi:

C = 2πr

lapho:

  • UC yindilinga
  • U-π (pi) ukufana kwezibalo cishe kulingana no-3.14159
  • r iyindawo engaba yindilinga

Irediyasi yibanga ukusuka enkabeni yesiyingi ukuya kunoma iyiphi indawo onqenqemeni.

Ububanzi buphindwe kabili irediyasi, ngakho-ke ukuzungeza kungavezwa ngokuthi:

C = πd

lapho:

  • d ububanzi

Isibonelo, uma i-radius yendilinga ingu-5 cm, khona-ke umjikelezo uthi:

C = 2πr = 2π * 5 cm = 10π cm

≈ 31.4 cm (izungezwe ezindaweni ezi-2 zamadesimali)

Amathiphu amaningi avela AhaSlides

AhaSlides unguMenzi Wemibuzo Ephezulu

Yenza imidlalo esebenzisanayo ngokuphazima kweso ngomtapo wethu wezifanekiso obanzi ukuze ubulale isithukuthezi

Abantu abadlala imibuzo AhaSlides njengomunye wemibono yephathi yokuzibandakanya
Imidlalo eku-inthanethi Ongayidlala Uma Unesizungu

Isiyingi sombuzo wombuthano

Umbuzo 1: Uma isiyingi sedamu lokubhukuda eliyindilinga singamamitha angama-50, ingakanani i-radius yayo?

A. 7.95 amamitha

B. 8.00 amamitha

C. 15.91 amamitha

D. 25 amamitha

Impendulo Elungile:

A. 7.95 amamitha

Incazelo:

Irediyasi ingatholakala ngokuhlela kabusha ifomula C = 2πr nokuxazulula u-r: r = C / (2π). Uma sixhuma kumjikelezo onikeziwe wamamitha angu-50 futhi cishe u-π uye ku-3.14, sithola irediyasi icishe ibe ngamamitha angu-7.95.

Umbuzo 2: Ububanzi bendilinga ngama-intshi angu-14. Ingakanani i-radius yayo?

A. 28 amayintshi

B.14 amayintshi

C. 21 amayintshi

D. 7 amayintshi

Impendulo Elungile:

D. 7 amayintshi

Incazelo:

Njengoba ububanzi buphindwe kabili ubude berediyasi (d = 2r), ungathola irediyasi ngokuhlukanisa ububanzi ngo-2 (r = d / 2).Kulokhu, ukuhlukanisa ububanzi obunikeziwe obungamayintshi angu-14 ngo-2 kukhiqiza i-a. ububanzi 7 amayintshi.

thola ukuzungeza kwesiyingi
Thola ukuzungeza kwesiyingi

Umbuzo 3: Yiziphi kulezi zitatimende ezilandelayo eziyiqiniso mayelana nobudlelwano phakathi kobubanzi kanye nomjikelezo wesiyingi?

A. Ububanzi buyingxenye yomjikelezo.

B. Ububanzi buyafana nomjikelezo.

C. Ububanzi buphinda kabili isiyingi.

D. Ububanzi buwu-π izikhathi zomjikelezo.

Impendulo Elungile:

A. Ububanzi buyingxenye yomjikelezo.

Incazelo:

Ububanzi bulingana ne-radius izikhathi ezi-2, kuyilapho isiyingi silingana no-2π izikhathi zerediyasi. Ngakho-ke, ububanzi buyingxenye yomjikelezo.

Umbuzo 4: Itafula okufanele sihlale kulo linomjikelezo wamayadi angu-6.28. Sidinga ukuthola ububanzi betafula.

A. 1 yadi

B. 2 amayadi

C. 3 amayadi

D. 4 amayadi

Impendulo Elungile:

B. 2 amayadi

Incazelo:

Umjikelezo wesiyingi ubalwa ngokuphindaphinda ububanzi ngo-pi (π). Kulokhu, umjikelezo unikezwa njengamayadi angu-6.28. Ukuze sithole ububanzi, sidinga ukuhlukanisa isiyingi ngo-pi. Ukuhlukanisa amayadi angu-6.28 ngo-pi kusinikeza cishe amayadi angu-2. Ngakho-ke, ububanzi betafula ngamayadi angu-2.

Umbuzo 5: Ingadi eyindilinga inomjikelezo wamamitha angama-36. Ingakanani indawo engadini?

A. 3.14 amamitha

B. 6 amamitha

C. 9 amamitha

D. 18 amamitha

Impendulo Elungile:

C. 9 amamitha

Incazelo:

Ukuze uthole irediyasi, sebenzisa ifomula yesiyingi: C = 2πr. Hlela kabusha ifomula ozoxazulula ngayo irediyasi: r = C / (2π). Ukuxhuma kumjikelezo onikeziwe wamamitha angu-36 futhi usebenzisa inani elilinganiselwe lika-π njengo-3.14, uthola u-r = 36 / (2 * 3.14) ≈ 9 amamitha.

Umbuzo 6: Ichibi lokubhukuda eliyindilinga linendawo engamamitha angu-8. Lingakanani ibanga elihanjwa umbhukudi azungeze ichibi lapho eqeda umzuliswano owodwa?

A. 16 amamitha

B. 25 amamitha

C. 50 amamitha

D. 100 amamitha

Impendulo Elungile:

C. 50 amamitha

Incazelo:

Ukuze uthole ibanga umbhukudi alihambayo ezungeza ichibi igxathu elilodwa, usebenzisa ifomula yesiyingi (C = 2πr). Kulokhu, kungcono 2 * 3.14 * 8 amamitha ≈ 50.24 amamitha, okuyinto cishe 50 amamitha.

Umbuzo 7: Lapho kukala i-hula hoop ekilasini, iqoqo C lithole ukuthi linendawo engama-intshi angu-7. Iyini isiyingi se-hula hoop?

A. 39.6 amayintshi

B. 37.6 amayintshi

C. 47.6 amayintshi

D. 49.6 amayintshi

Impendulo Elungile:

C. 47.6 amayintshi

Incazelo:

Umjikelezo wombuthano ungatholwa kusetshenziswa ifomula C = 2πr, lapho u-r eyirediyasi yesiyingi. Kulokhu, i-radius ye-hula hoop inikezwa njengama-intshi angu-7. Sixhuma leli nani kufomula, sithola u-C = 2π(7) = 14π amayintshi. Ukulinganisa u-π kuye ku-3.14, singabala umjikelezo njengo-14(3.14) = 43.96 amayintshi. Izungezwa endaweni yeshumi eseduze, isiyingi singama-intshi angu-47.6, okuhambisana nempendulo enikeziwe.

Umbuzo 8: I-semicircle ine-radius engamamitha ayi-10. Uyini umjikelezo wayo?

A. 20 amamitha

B. 15 amamitha

C. 31.42 amamitha

D. 62.84 amamitha

Impendulo Elungile:

C. 31.42 amamitha

Incazelo:Ukuze uthole i-perimeter ye-semicircle, bala uhhafu womjikelezo wendingilizi egcwele enobubanzi obungamamitha ayi-10.

umjikelezo wesibonelo esiyindilinga
Isiyingi sesibonelo sendingilizi

Umbuzo 9: Iqembu le-basketball lidlala ngebhola eline-radius engama-intshi angu-5.6. Ingakanani isiyingi ye-basketball ngayinye?

A. 11.2 amayintshi

B. 17.6 amayintshi

C. 22.4 amayintshi

D. 35.2 amayintshi

Impendulo Elungile:

C. 22.4 amayintshi

incazelo:

Ungasebenzisa ifomula yesiyingi esiyindilinga, engu-C = 2πr. Irediyasi enikeziwe ingamayintshi angu-5.6. Xhuma leli nani kufomula, sino-C = 2π * 5.6 amayintshi. C ≈ 2 * 3.14 * 5.6 amayintshi. C ≈ 11.2 * 5.6 amayintshi. C ≈ 22.4 amayintshi. Ngakho-ke, isiyingi se-basketball ngayinye singamayintshi angama-22.4. Lokhu kumelela ibanga elizungeze i-basketball.

Umbuzo 10: U-Sarah nabangane bakhe ababili bakha itafula lepikiniki eliyindilinga lapho behlangana khona. Babazi ukuthi ukuze bonke bahlale ngokunethezeka bezungeza itafula, babedinga isiyingi esingamafidi angu-18. Itafula lepikiniki kufanele libe nedayimitha engakanani ukuze lifinyelele isiyingi esifanele?

A. 3 izinyawo

B. 6 izinyawo

C. 9 izinyawo

D. 12 izinyawo

Impendulo Elungile:

B. 6 izinyawo

Incazelo:

Ukuze uthole irediyasi, hlukanisa isiyingi ngo-2π, sino-r = C / (2π) r = amafidi angu-18 / (2 * 3.14) r ≈ 18 izinyawo / 6.28 r ≈ 2.87 amafidi (okuyindilinga kuya kwekhulu eliseduze).

Manje, ukuze uthole ububanzi, vele uphindwe kabili irediyasi: Ububanzi = 2 * Ububanzi beRadiyasi ≈ 2 * 2.87 feet Diameter ≈ 5.74 feet. Ngakho, ithebula lepikiniki kufanele libe nobubanzi obungamafidi angaba ngu-5.74

Ukuthatha okhiye

AhaSlides ingumenzi wemibuzo osebenzisanayo ongcono kakhulu isigqoko esingasetshenziselwa imfundo, ukuqeqeshwa, noma izinjongo zokuzijabulisa. Hlola AhaSlides ngokushesha ukuze ngikhululeke izifanekiso ezenziwe ngezifisonezici ezithuthukisiwe!

imibuzo ejwayelekile ukubuzwa

Uyini u-2πr wombuthano?

U-2πr uyifomula yesiyingi somjikelezo. Kule fomula:

  • "2" imele ukuthi uthatha kabili ubude berediyasi. Umjikelezo yibanga lokuzungeza indilinga, ngakho-ke udinga ukuzungeza indilinga kanye futhi futhi, yingakho siphindaphinda ngo-2.
  • "π" (pi) iyisimo sezibalo esingaguquki cishe esilingana no-3.14159. Isetshenziswa ngoba imele ubuhlobo phakathi komjikelezo nobubanzi bomjikelezo.
  • "r" imele indawo engaba yindilinga, okuyibanga ukusuka enkabeni yesiyingi ukuya kunoma iyiphi indawo kumjikelezo wayo.

Kungani ukuzungeza kungu-2πr?

Ifomula yesiyingi esiyindilinga, C = 2πr, isuka encazelweni ka-pi (π) kanye nezici zejiyomethri zendilinga. U-Pi (π) umele isilinganiso somjikelezo wendilinga ukuya kububanzi bawo. Uma uphindaphinda irediyasi (r) ngo-2π, empeleni ubala ibanga elizungeze indilinga, okuyincazelo yesiyingi.

Ingabe isiyingi siphindwe ka-3.14 kunerediyasi?

Cha, ukuzungeza akukona ncamashi izikhathi ezingu-3.14 zerediyasi. Ubudlelwano phakathi komjikelezo kanye nerediyasi yesiyingi bunikezwa ifomula ethi C = 2πr. Ngenkathi u-π (pi) ecishe abe ngu-3.14159, isiyingi siphindwe izikhathi ezingu-2 ku-radius. Ngakho-ke, isiyingi singaphezu nje kokuphindwe ka-3.14 kunobubanzi; izikhathi ezi-2 ngo-π ngerediyasi.

Ref: I-Omni Caculator | UProf