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given f(x)=-3/4x^3 +1/2x^2+10x-7/9 and g(x)=|0.5x+2|-7 state the negative solutions to the equation f(x)=g(x) rounded to the nearest thousandth

User Dominik G
by
3.1k points

2 Answers

26 votes
26 votes

Answer:

(-2.965, -0.464)

Explanation:

User Cw Fei
by
3.4k points
12 votes
12 votes

9514 1404 393

Answer:

{-2.965, -0.464}

Explanation:

A graphing calculator shows the solutions to be about -2.965 and -0.464.

A machine solver for the cubic gives the three solutions as approximately ...

{-2.9650134903182933558,

-0.46362503406015100280,

4.0953051910451110253}

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The attached graph shows the solutions to f(x) = g(x).

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Additional comment

The equation could resolve to a single cubic in standard form:

-3/4x^3 +1/2x^2 +10x -7/9 = |0.5x +2| -7

Multiplying by 36 gives ...

-27x^3 +18x^2 +360x -28 = |18x +72| -252

For the case where x > -4, we can subtract (18x -180) from both sides to get ...

-27x^3 +18x^2 +342x +152 = 0

The roots of this cubic equation are the solutions to f(x) = g(x) as given above. If you want to find them by iteration, a suitable starting point is -152/342 = -4/9.

given f(x)=-3/4x^3 +1/2x^2+10x-7/9 and g(x)=|0.5x+2|-7 state the negative solutions-example-1
User Jsonbourne
by
2.8k points
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