Matematické Fórum

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Nejste přihlášen(a). Přihlásit

#1 17. 11. 2022 18:49 — Editoval Dante24 (17. 11. 2022 18:49)

Dante24
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Goniometrické funkce

Dobrý večer, potřebuju poradit jak na to, nevím jak to vypočítat
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#2 17. 11. 2022 20:41

Al1
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Re: Goniometrické funkce

↑ Dante24:
Zdravím,
základem je obrázek podobný jako zde

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#3 19. 11. 2022 15:09

Dante24
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Re: Goniometrické funkce

Dobrý den , zkoušel jsem to  celý den , vyšlo mi to 7,2 m. Myslíte že je to správně ?

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#4 19. 11. 2022 15:28 — Editoval Pomeranc (19. 11. 2022 15:30)

Pomeranc
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Re: Goniometrické funkce

↑ Dante24:

Dobrý den,

tak správně  to být nemůže, už když se nad tím zamyslíte logicky.
Jste 10 metrů nad zemí. Aby jste viděl vršek věže, tak se díváte pod výškovým úhlem (tj. nahoru) .
Kdyby věž měla jen 7,2m, což je méně než 10 metrů, tak byste se na vršek věže musel dívat pod hloubkovým úhlem (tj. dolu) .

Jak vám radil kolega, překreslete si obrázek. Napište si tam, co všechno znáte a co byste chtěl spočítat. Máte tam dva pravoúhlé trojúhelníky.
K výpočtu vám budou stačit znát definice goniometrických funkcí.

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#5 19. 11. 2022 15:30

Al1
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Re: Goniometrické funkce

↑ Dante24:
To je málo, věž je určitě vyšší než 10 m, jinak by nemohl být zadaný výškový úhel na vrchol věže. Mně vyšlo 37,5 m.
Celá věž je 10 m + y. Pomocí troj. s úhlem 11 st. 23 min a rozměrem 10 m vypočítej vodorovnou vzdálenost x paty věže a paty pozorovacího místa. A tohle x a úhel 28 st 57 min. využij k výpočtu y.
V obou případech máš pravoúhlý troj.

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#6 19. 11. 2022 15:35

Dante24
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Re: Goniometrické funkce

↑ Al1:
Děkuju, nedošlo mi že tam jsou dva pravoúhlý trojúhelníky , zkusím to ještě jednou.

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