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COMBINING FUNCTIONS. COMBINING FUNCTIONS. SOME FUNCTION RULES : SUM DIFFERENCE PRODUCT QUOTIENT . COMBINING FUNCTIONS. EXAMPLE # 1 : Find . COMBINING FUNCTIONS. EXAMPLE # 1 : Find . COMBINING FUNCTIONS. EXAMPLE # 1 : Find . EXAMPLE # 2 : Find .
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COMBINING FUNCTIONS SOME FUNCTION RULES : SUM DIFFERENCE PRODUCT QUOTIENT
COMBINING FUNCTIONS EXAMPLE # 1 : Find
COMBINING FUNCTIONS EXAMPLE # 1 : Find
COMBINING FUNCTIONS EXAMPLE # 1 : Find EXAMPLE # 2 : Find
COMBINING FUNCTIONS EXAMPLE # 1 : Find EXAMPLE # 2 : Find
COMBINING FUNCTIONS EXAMPLE # 3 : Find
COMBINING FUNCTIONS EXAMPLE # 3 : Find EXAMPLE # 4 : Find
COMBINING FUNCTIONS COMPOSITE FUNCTIONS :
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : EXAMPLE : Find
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : EXAMPLE : Find
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : EXAMPLE # 2 : Find
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : EXAMPLE #2 : Find
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : EXAMPLE # 3 : Find
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : EXAMPLE # 3 : Find
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : In some cases, we will be given the composite function and we will need to find the two functions that created that composite function.
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : In some cases, we will be given the composite function and we will need to find the two functions that created that composite function. In most cases, look for expressions inside parentheses and also expressions under roots. However, this is not always the way to attack these problems.
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : In some cases, we will be given the composite function and we will need to find the two functions that created that composite function. In most cases, look for expressions inside parentheses and also expressions under roots. However, this is not always the way to attack these problems. EXAMPLE : is the result of a composite function Find f(x) and g(x).
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : In some cases, we will be given the composite function and we will need to find the two functions that created that composite function. In most cases, look for expressions inside parentheses and also expressions under roots. However, this is not always the way to attack these problems. EXAMPLE : is the result of a composite function Find f(x) and g(x). Think ; I have “something” raised to the third power. The “something” is g(x), raised to the third power
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : In some cases, we will be given the composite function and we will need to find the two functions that created that composite function. In most cases, look for expressions inside parentheses and also expressions under roots. However, this is not always the way to attack these problems. EXAMPLE : is the result of a composite function Find f(x) and g(x). Think ; I have “something” raised to the third power. The “something” is g(x), raised to the third power
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : In some cases, we will be given the composite function and we will need to find the two functions that created that composite function. In most cases, look for expressions inside parentheses and also expressions under roots. However, this is not always the way to attack these problems. EXAMPLE : is the result of a composite function Find f(x) and g(x).
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : In some cases, we will be given the composite function and we will need to find the two functions that created that composite function. In most cases, look for expressions inside parentheses and also expressions under roots. However, this is not always the way to attack these problems. EXAMPLE : is the result of a composite function Find f(x) and g(x). Think ; I have the square root of“something” . The “something” is g(x), under a square root
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : In some cases, we will be given the composite function and we will need to find the two functions that created that composite function. In most cases, look for expressions inside parentheses and also expressions under roots. However, this is not always the way to attack these problems. EXAMPLE : is the result of a composite function Find f(x) and g(x). Think ; I have the square root of“something” . The “something” is g(x), under a square root
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : When determining the domain of composite functions, it is necessary to look at domain values individually as well as the composite.
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : When determining the domain of composite functions, it is necessary to look at domain values individually as well as the composite. EXAMPLE :
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : When determining the domain of composite functions, it is necessary to look at domain values individually as well as the composite. EXAMPLE : The domian of ƒ(x) is all real numbers except zero…
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : When determining the domain of composite functions, it is necessary to look at domain values individually as well as the composite. EXAMPLE : The domian of ƒ(x) is all real numbers except zero… Performing the composite …
COMBINING FUNCTIONS COMPOSITE FUNCTIONS : When determining the domain of composite functions, it is necessary to look at domain values individually as well as the composite. EXAMPLE : The domian of ƒ(x) is all real numbers except zero… Performing the composite … Domain – all real numbers except x = 0, - 3