Kelso Math A1 #18 IM - Algebra 1 - Lesson 5.12 (15 problems)

Last updated about 5 years ago

15 questions

Note from the author:

F.IF.4

F.LE.5

Kelso Math A1 #18 IM - Algebra 1 - Lesson 5.12 (15 problems)

Last updated about 5 years ago

15 questions

Note from the author:

Illustrative Math

Just the letter of the function that grows the least quickly...(looking at the equations, not the graph!)

Draggable item		Corresponding Item

F.IF.4

F.LE.5

Just tell me about the a value that function h (Graph B) would have.

So 2 graphs on the same image. Notice I upped the point value here. I should see 3 points at least for each function.

To the nearest whole dollar...

We have released a new and improved Graphing question type! Students will no longer be able to answer this question.

At what point do the 2 graphs from #11 intersect?

A mice population is increasing exponentially monthly since the cat died. When the cat died there were 8 mice, the next month 12, then 18 the next! What is the growth factor?

Draggable item		Corresponding Item
y=100*3^{x}		M
y=20*3^{x}		L
y=50*3^{x}		K

Kelso Math A1 #18 IM - Algebra 1 - Lesson 5.12 (15 problems)

Kelso Math A1 #18 IM - Algebra 1 - Lesson 5.12 (15 problems)

Just the letter of the function that grows the least quickly...(looking at the equations, not the graph!)

Just tell me about the a value that function h (Graph B) would have.

So 2 graphs on the same image. Notice I upped the point value here. I should see 3 points at least for each function.

To the nearest whole dollar...

At what point do the 2 graphs from #11 intersect?

A mice population is increasing exponentially monthly since the cat died. When the cat died there were 8 mice, the next month 12, then 18 the next! What is the growth factor?

Write an equation for the cat situation above. Use t for the time in months and f(t) to represent the total mice at that time.

So how many mice will there be after a year, assuming a new cat doesn't come along? Round to nearest whole mouse.

Just the letter of the function that grows the least quickly...(looking at the equations, not the graph!)

Just the letter of the function that grows the most quickly...

Here are graphs of three exponential equations.
Match each equation with its graph.

Just tell me about the a value that function h (Graph B) would have.

Now tell me about the b value that function h (that's graph B) would have.

So 2 graphs on the same image. Notice I upped the point value here. I should see 3 points at least for each function.

To the nearest whole dollar...

The question refers to this situation only, not in general.

At what point do the 2 graphs from #11 intersect?

A mice population is increasing exponentially monthly since the cat died. When the cat died there were 8 mice, the next month 12, then 18 the next! What is the growth factor?

Write an equation for the cat situation above. Use t for the time in months and f(t) to represent the total mice at that time.

So how many mice will there be after a year, assuming a new cat doesn't come along? Round to nearest whole mouse.

Just the letter of the function that grows the most quickly...

Match the function to the graph

Now tell me about the b value that function h (that's graph B) would have.

The question refers to this situation only, not in general.

Kelso Math A1 #18 IM - Algebra 1 - Lesson 5.12 (15 problems)

Kelso Math A1 #18 IM - Algebra 1 - Lesson 5.12 (15 problems)

Just the letter of the function that grows the least quickly...(looking at the equations, not the graph!)

Just tell me about the a value that function h (Graph B) would have.

So 2 graphs on the same image. Notice I upped the point value here. I should see 3 points at least for each function.

To the nearest whole dollar...

At what point do the 2 graphs from #11 intersect?

A mice population is increasing exponentially monthly since the cat died. When the cat died there were 8 mice, the next month 12, then 18 the next! What is the growth factor?

Write an equation for the cat situation above. Use t for the time in months and f(t) to represent the total mice at that time.

So how many mice will there be after a year, assuming a new cat doesn't come along? Round to nearest whole mouse.

Just the letter of the function that grows the least quickly...(looking at the equations, not the graph!)

Just the letter of the function that grows the most quickly...

Here are graphs of three exponential equations.Match each equation with its graph.

Just tell me about the a value that function h (Graph B) would have.

Now tell me about the b value that function h (that's graph B) would have.

So 2 graphs on the same image. Notice I upped the point value here. I should see 3 points at least for each function.

To the nearest whole dollar...

The question refers to this situation only, not in general.

At what point do the 2 graphs from #11 intersect?

A mice population is increasing exponentially monthly since the cat died. When the cat died there were 8 mice, the next month 12, then 18 the next! What is the growth factor?

Write an equation for the cat situation above. Use t for the time in months and f(t) to represent the total mice at that time.

So how many mice will there be after a year, assuming a new cat doesn't come along? Round to nearest whole mouse.

Just the letter of the function that grows the most quickly...

Match the function to the graph

Now tell me about the b value that function h (that's graph B) would have.

The question refers to this situation only, not in general.

Here are graphs of three exponential equations.
Match each equation with its graph.