지오지브라 기능 써보기
지오지브라 기능을 사용하여 다음의 과제를 순서대로 완성해 봅시다.
1. 점 A(2,0) 찍기[br][br]2. 중심이 A이고 반지름이 4인 원 그리기[br][br]3. 원 위에 대상위의 점 B 잡기[br][br]4. 점 B에서 원에 접하는 접선 그리기[br] -접선 메뉴로 그려보기[br] -접선 메뉴를 사용하지 않는다면 어떤 방법이 있을까??[br][br]5. 원 위에 임의의 점 C를 잡을 때 그냥 점과 대상위의 점은 차이가 있을까?[br] 또 다시 대상 위의 점 C를 원 위에 잡아보세요.[br][br]6. 원의 중심 A와 원 위의 두 점 B와 C를 각각 선분으로 연결하여 부채꼴 만들기[br][br]7. 부채꼴의 중심각의 크기 구하기 [br][br]8. 슬라이더 기능 사용[br] 1) 슬라이더를 클릭하고 좌표평면 아무데나 클릭한다.[br] 2) 슬라이더 창에서 최솟값을 -4, 최댓값을 4로 변경한다.[br] 3) 대수창에 [math]y=x+a[/math]를 입력한다.[br] 4) 슬라이더를 양쪽으로 끌어본다. [br]
삼각함수의 뜻
삼각함수란?
좌표평면의 원점 [math]O[/math]에서 [math]x[/math]축의 양의 방향으로 시초선을 잡을 때,[br][br]원점 [math]O[/math]를 중심으로 하고 반지름이 [math]r[/math]인 원과 일반각 [math]\theta[/math]를 나타내는 동경(빨간 화살표)의 교점 [math]P\left(x,y\right)[/math]에 대하여, 다음 물음에 답하시오.[br][img]data:image/png;base64,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[/img] [br]
다음 문항에 옳은 답을 고르세요.
1. 각을 생각할 때 기준이 되는 선은 [math]x[/math]축의 양의 방향 부분입니다. 이 부분의 이름을 무엇이라고 합니까?
2. 반지름이 [math]r[/math]인 원과 시초선으로부터 각의 크기가 [math]\theta[/math]인 동경이 만나는 점 [math]P\left(x,y\right)[/math][math][/math]에 대하여 [math]sin\theta[/math]의 값은?[br]
3. 반지름이 [math]r[/math]인 원과 시초선으로부터 각의 크기가 [math]\theta[/math]인 동경이 만나는 점 [math]P\left(x,y\right)[/math][math][/math]에 대하여 [math]cos\theta[/math]의 값은?[br]
4. 반지름이 [math]r[/math]인 원과 시초선으로부터 각의 크기가 [math]\theta[/math]인 동경이 만나는 점 [math]P\left(x,y\right)[/math][math][/math]에 대하여 [math]tan\theta[/math]의 값은?[br]