Sketch the graph of the function. Describe how the graph can be obtained from the graph of a basic logarithmic function.
-$$f ( x ) = \frac { 1 } { 4 } \log ( x + 2 ) + 4$$

A) Shift $y = \log x$ to the left 2 units, stretch it vertically, and shift up 4 units
B) Shift $y = \log x$ to the right 2 units ,shrink it vertically, and shift up 4 units
C) Shift $y = \log x$ to the left 2 units, shrink it vertically, and shift down 4 units
D) Shift $y = \log x$ to the left 2 units, shrink it vertically, and shift up 4 units

Question

Sketch the graph of the function. Describe how the graph can be obtained from the graph of a basic logarithmic function.
-$$f ( x ) = \frac { 1 } { 4 } \log ( x + 2 ) + 4$$

A) Shift $y = \log x$ to the left 2 units, stretch it vertically, and shift up 4 units 
B) Shift $y = \log x$ to the right 2 units ,shrink it vertically, and shift up 4 units 
C) Shift $y = \log x$ to the left 2 units, shrink it vertically, and shift down 4 units 
D) Shift $y = \log x$ to the left 2 units, shrink it vertically, and shift up 4 units

Quizplus · Accepted Answer

The Answer of Sketch the graph of the function. Describe how the graph can be obtained from the graph of a basic logarithmic function.
-$$f ( x ) = \frac { 1 } { 4 } \log ( x + 2 ) + 4$$

A) Shift $y = \log x$ to the left 2 units, stretch it vertically, and shift up 4 units 
B) Shift $y = \log x$ to the right 2 units ,shrink it vertically, and shift up 4 units 
C) Shift $y = \log x$ to the left 2 units, shrink it vertically, and shift down 4 units 
D) Shift $y = \log x$ to the left 2 units, shrink it vertically, and shift up 4 units

Sketch the Graph of the Function f(x)=14log⁡(x+2)+4f ( x ) = \frac { 1 } { 4 } \log ( x + 2 ) + 4f(x)=41​log(x+2)+4

Sketch the Graph of the Function $f ( x ) = \frac { 1 } { 4 } \log ( x + 2 ) + 4$