Linear Functions (1)

For two functions , find the value of .

For the function Remainder of divided by , find the value of .

When for , evaluate .

For a function , when and , find . (Here, is a constant.)

The linear function traverses two points and . Find the value of . (Note: is a constant)

Two linear functions and intersect at . Find when is a constant.

When the graph of linear function is translated parallel to axis by , it became the graph of linear function . Find the value of at this time. (note: are constants)

If the graph of the linear function is translated parallel to axis by , it passes the point . Find the value of .

When the graph of is translated parallel to axis by , it passes two points , . Find the value of in this case.

For the graph of linear function , -intercept is , -intercept is . Find the value of in this case.

If -intercept of is , find the value of -intercept. (note: is a constant)

The graphs of two linear functions , pass the same point on axis. Find the value of a constant in this case.

Choose a linear function whose value decreases by if the value of increases by .

For the linear function , if increases from to , increases by . Find the value of in this case.

Linear function passes the point . If decreases by when increases by . Find the value of . (note, , are constants)

When the slope of a linear function traversing two points and is , find the value of .

For a linear function, -intercept is , -intercept is and the slope is . Find the value of .

Three points , , and are on the same line. Find the value of .

From the graph of the linear function , -intercept is , -intercept is and the slope is . Find the value of in this case.

When a linear function is translated in the direction of -axis by , it will have the slope of , -intercept of , -intercept of . Find the value of .

Find the quadrant where the graph of does not pass.

Find the area of the shape surrounded by the graph of , -axis and -axis.