Question

HELP PLZ WILL GIVE MEDAL AND FAN
You are going to write a fairy tale! Your story should include all of the standard elements of fairy tales.

Begins “Once upon a time…”
Animals can act like humans
Magical items or helpers
Ends “…happily ever after.”

Your story must also fully cover these math concepts. This is an educational fairy tale… the best kind!

Create a quadratic function with two real zeros.
Solve a system of non-linear equations with a graph.
Solve a system of non-linear equations with a table.

Answer 1

Solve a system of non-linear equations with a table.
Compare linear, quadratic, and exponential growth functions using a table and a graph. Submit the graph and table.
Identify that exponential functions exceed linear and quadratic functions.

Answer 2

@ganeshie8 never seen such creative question ! so epic lol

Answer 3

lol its a question for my algebra hw 1 i need help

Answer 4

there must be an alternative for doing this assignment ?
usually you will be given two different options to pick

Answer 5

i know ^_^ i just like these creative question .
so you wrote the story yet ?

Answer 6

yes ganesh is write the story should have one topic of these not all of them together
Create a quadratic function with two real zeros.
Solve a system of non-linear equations with a graph.
Solve a system of non-linear equations with a table.

Answer 7

or at least they are two topics to me
1- Create a quadratic function with two real zeros.
2 - * Solve a system of non-linear equations with a graph.
** Solve a system of non-linear equations with a table.

Answer 8

yes there is another option i can post that one as well and u guys can help me with on of them

Answer 9

one*

Answer 10

hmm , ok go ahead :o

Answer 11

@ikram002p he can do either this question or another question... he is free to choose

Answer 12

personally i don't like writing stories because im not so creative in writing haha!

Answer 13

This project may be completed individually or collaboratively.

The town of West Mathington needs help planning some roads that will connect parts of their fair city. The town of West Mathington is laid out so that North is the positive y-axis, and East is the positive x-axis. The roads will follow the paths of graphs created from linear, quadratic, and exponential functions.

These samples provided will give you an idea of what a final map could look like.

Answer 14

West Mathington’s most urgent need is a parabolic freeway. Create your own upward opening quadratic function, f(x), which has two real zeros. Prove that f(x) has two real zeros.

If you are doing this project collaboratively, then your partner will need to create a unique second freeway function, g(x), and prove that it also has two real zeros.
Two on-ramps are needed to be placed on the parabolic freeway. Decide where on the parabola of f(x) you are placing the on-ramp locations. Write those ordered pairs down.

If you are working collaboratively, identify four on-ramps, two on each function.
West Mathington wants to connect these on-ramps with some surface roads.
Create a linear growth function, h(x), that passes through both on-ramp points.
Create an exponential growth function, j(x), that passes through at least one of the on-ramp points.

Show all of the work you did to create both functions.

Collaborative pairs need to connect linear function h(x) through the on ramp points on f(x), and connect exponential function j(x) through any on ramp point on g(x). At least three of the four on ramp points will be used.
What important relationship does the x-coordinates of the on-ramp location points have with the system of equations formed by the two roads’ functions that are being connected? Provide justification and support for your explanation.

The city planner needs to identify the most northern road. Prove which road will eventually go the furthest to the north (positive y-direction). Create tables for your functions using an appropriate domain of five integers. Using the tables and graph, explain to the city planner which road will be the furthest north as the x values continue to get larger (the road continues to go east). Provide reasoning why.

Collaborative groups should prove whether f(x) or h(x) is the most northern between the two, and whether g(x) or j(x) is the most northern between those two.
Include your graph that shows the functions that model each of the roads and the on-ramps.

Answer 15

whats the other option ?
lol u think that :P but if u tried you would find some tagore hidden there ,
how ever i would get A easily with this :O

Answer 16

its way more than the other option

Answer 17

can u guys possibly help me with one of the two

Answer 18

what question ur gonna do for assiment ?!

Answer 19

both look equally painful to me

Answer 20

whichever one u guys can help me with i will do or if u guys can get someone else to help as well

Answer 21

have u even tried ?
like forget the first one if you dont have a story , did you read the second ?
(its only steps to do something with drama words ,nothing more)
less math

Answer 22

i will steal both questions lol xD

Answer 23

You need to answer below questions for \(\text{Option2 :}\)

\(1)\) Create your own upward opening quadratic function, f(x), which has two real zeros. Prove that f(x) has two real zeros.

\(2)\) Two on-ramps are needed to be placed on the parabolic freeway. Decide where on the parabola of f(x) you are placing the on-ramp locations. Write those ordered pairs down.

\(3)\) West Mathington wants to connect these on-ramps with some surface roads.
\(a)\) Create a linear growth function, h(x), that passes through both on-ramp points.
\(b)\) Create an exponential growth function, j(x), that passes through at least one of the on-ramp points.

Show all of the work you did to create both functions.

\(4) \) The city planner needs to identify the most northern road. Prove which road will eventually go the furthest to the north (positive y-direction). Create tables for your functions using an appropriate domain of five integers. Using the tables and graph, explain to the city planner which road will be the furthest north as the x values continue to get larger (the road continues to go east). Provide reasoning why.

Answer 24

\(1)\) Create your own upward opening quadratic function, f(x), which has two real zeros. Prove that f(x) has two real zeros.



start by writing a quadratic function f(x)

Answer 25

thats simple enough i guess , more flexable that Q 1 as an assiment

Answer 26

Ok i was eating so I'll try to do the steps u provided