Eliminate the parameter.

x = one divided by two t, y = 3t^3 - 1

Answer choices:
y = three divided by eight t^3 - 1
y = 24x^3 - 1
y = 6x^3 - 1
y = 24x - 1

Answer:
y = 24x³ - 1

Explanation:
We have:
x = [tex] \frac{1}{2} t[/tex]
This means that:
t = 2x ...............> I

We are also given that:
y = 3t³ - 1 .............> II

Substitute with I in II to eliminate the t as follows:
y = 3t³ - 1
y = 3*(2x)³ - 1
y = 3*8x³ - 1
y = 24x³ - 1

Hope this helps :)

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aencabo aencabo · Answer 2 · 2018-05-12T03:26:51+02:00

aencabo aencabo

12-05-2018

x = one divided by two t
x = 1/2t; t = 2x

Substitute the t in the equation:
y = 3t^3 - 1
y = 3(2x)^3 - 1
y = 3(8x^3) - 1
y = 24x^3 - 1

The answer is y = 24x^3 - 1

Hope this helps! Goodluck

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Eliminate the parameter. x = one divided by two t, y = 3t^3 - 1 Answer choices: y = three divided by eight t^3 - 1 y = 24x^3 - 1 y = 6x^3 - 1 y = 24x - 1

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Eliminate the parameter.

x = one divided by two t, y = 3t^3 - 1

Answer choices:
y = three divided by eight t^3 - 1
y = 24x^3 - 1
y = 6x^3 - 1
y = 24x - 1