= loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y...
Transcript of = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y...
![Page 1: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/1.jpg)
Definition of y = loga x
y = loga x의정의(Definition of y = loga x)
Min Eun Gi : https://min7014.github.io
![Page 2: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/2.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 3: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/3.jpg)
Definition of y = loga x
Definition
지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 4: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/4.jpg)
Definition of y = loga x
Definition지수함수 y = ax
(a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 5: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/5.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은
실수전체의집합에서양의실수
전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 6: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/6.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서
양의실수
전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 7: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/7.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의
일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 8: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/8.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로
역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 9: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/9.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 10: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/10.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 11: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/11.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax
⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 12: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/12.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 13: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/13.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로
x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 14: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/14.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서
x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 15: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/15.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를
서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 16: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/16.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면
지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 17: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/17.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의
역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 18: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/18.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 19: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/19.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x
(a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 20: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/20.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)
이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 21: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/21.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.
이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 22: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/22.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를
a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 23: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/23.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를
밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 24: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/24.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는
로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 25: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/25.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 26: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/26.jpg)
Definition of y = loga x
Definition지수함수 y = ax (a > 0, a 6= 1)은실수전체의집합에서양의실수전체의집합으로의일대일대응이므로역함수가존재한다.
이때로그의정의에따라
y = ax ⇔ x = loga y
이므로 x = loga y에서 x와 y를서로바꾸면지수함수 y = ax
의역함수는
y = loga x (a > 0, a 6= 1)이다.이함수를 a를밑으로하는로그함수라고한다.
Min Eun Gi : https://min7014.github.io
![Page 27: = loga X (Definition of y = loga x · Definition of y = log a x y = log a x X X (Definition of y = log a x) Min Eun Gi :](https://reader035.fdocument.pub/reader035/viewer/2022063014/5fd0a79078c80a1e6742f526/html5/thumbnails/27.jpg)
Definition of y = loga x
Github:https://min7014.github.io/math20200311002.html
Click or paste URL into the URL searchbar, and you can see a picture moving.
Min Eun Gi : https://min7014.github.io