Question

Indicate whether the following statement is true or false: A linear function eventually exceeds a quadratic function with a positive leading coefficient.

Answer 1

Indicate whether the following statement is true or false: A linear function eventually exceeds a quadratic function with a positive leading coefficient.

True

or

False??

Answer 2

let's use
\(\tt{y=2x\\y=2x^2}\)

which one will increase at a quicker pace?

Answer 3

@MeowLover17 ?

Answer 4

So its false

Answer 5

@Mehek14

Answer 6

?

Answer 7

yes false

Answer 8

Ok can i ask one more question??

Answer 9

For two functions, a(x) and b(x), a statement is made that a(x) = b(x) at x = 2. What is definitely true about x = 2?

Answer 10

choices?

Answer 11

Both a(x) and b(x) have a maximum or minimum value at x = 2.
Both a(x) and b(x) have the same output value at x = 2.
Both a(x) and b(x) cross the x-axis at 2.
Both a(x) and b(x) cross the y-axis at 2.

Answer 12

each line is a different choice

Answer 13

what do you think?

Answer 14

I believe its A

Answer 15

well you don't know if it's a linear or quadratic function

Answer 16

But i dont know how or why

Answer 17

Yes we dont know

Answer 18

so A can't be the answer

Answer 19

Wait is it C?

Answer 20

not always true

Answer 21

Oh i see

Answer 22

So the answer has to be B

Answer 23

yes B
a(x) = b(x) means that you will get the same answer when you put x = 2

Answer 24

Thank you so much <3

Answer 25

yw
\(\color{red}{\heartsuit}\)