Problem 63 One solution of \(4 x^{2}+b x-3=... [FREE SOLUTION]

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Chapter 11: Problem 63

One solution of \(4 x^{2}+b x-3=0\) is \(-\frac{5}{2} .\) Find \(b\) and the other solution.

Short Answer

Expert verified

b is 8.8 and the other solution is \(\frac{3}{10}\).

Step by step solution

Identify the known values

Given the quadratic equation is \(4x^{2} + bx - 3 = 0\) and one solution is \(-\frac{5}{2}\).

Use Vieta's formulas

Vieta's formulas state that for a quadratic equation \(ax^2 + bx + c = 0\) the sum of the roots \(r_1 + r_2 = -\frac{b}{a}\) and the product of the roots \(r_1 \times r_2 = \frac{c}{a}\).

Express the sum of the roots

The sum of the roots \(r_1 + r_2 = -\frac{b}{4}\). Given one root \(-\frac{5}{2}\), let the other root be \(r\). Then the sum is \(-\frac{5}{2} + r = -\frac{b}{4}\).

Express the product of the roots

The product of the roots \(\left(-\frac{5}{2}\right) \times r = \frac{-3}{4}\).

Solve for the other root

Solve \(\left(-\frac{5}{2}\right) \times r = \frac{-3}{4}\) for \(r\): \[ r = \frac{-3}{4} \div -\frac{5}{2} = \frac{-3}{4} \times -\frac{2}{5} = \frac{6}{20} = \frac{3}{10} \].

Substitute to find b

Substitute \(r = \frac{3}{10}\): \[ -\frac{5}{2} + \frac{3}{10} = -\frac{b}{4} \]. Simplify the sum: \[ -\frac{25}{10} + \frac{3}{10} = -\frac{22}{10} = -\frac{11}{5} \]. Thus, \[ -\frac{11}{5} = -\frac{b}{4} \]. Solve for \(b\): \[ \frac{11}{5} = \frac{b}{4} \Rightarrow b = 4 \times \frac{11}{5} = \frac{44}{5} = 8.8 \].

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Vieta's formulas

Vieta's formulas are a useful tool when solving quadratic equations. They help relate the coefficients of the equation to the sums and products of its roots. For any quadratic equation of the form \(ax^2 + bx + c = 0\), Vieta's formulas state the following:

The sum of the roots \(r_1 + r_2 = -\frac{b}{a}\)
The product of the roots \(r_1 \times r_2 = \frac{c}{a}\)

In our example, we have the quadratic equation \(4x^2 + bx - 3 = 0\). Using Vieta's formulas:

The sum of the roots is \(-\frac{b}{4}\)
The product of the roots is \(\frac{-3}{4}\)

This information is crucial to find the unknown coefficients or to cross-verify the solutions.

Roots of a quadratic equation

The 'roots' of a quadratic equation are the values of \(x\) that satisfy the equation. These roots can either be real or complex numbers. Given a quadratic equation in standard form \(ax^2 + bx + c = 0\), the roots are \(r_1\) and \(r_2\).

Real roots if the discriminant (\(b^2 - 4ac\)) is positive or zero.
Complex roots if the discriminant is negative.

In the exercise, we already know one of the roots: \(-\frac{5}{2}\). We denote the other root as \(r\). By using Vieta's product formula, we can solve for the other root:
\left( -\frac{5}{2} \right) \times r = \frac{-3}{4} \
Simplifying this, we get \(r = \frac{3}{10}\). By establishing both roots, we are better positioned to find the remaining coefficients.

Quadratic equation solutions

Solving a quadratic equation involves finding its roots. We can do this using a variety of methods including factoring, completing the square, or applying the quadratic formula. However, Vieta's formulas provide a quick way to find missing coefficients when some roots are known.

In the given exercise, we followed these steps:

Used Vieta's formulas to express the sum and product of the roots in terms of \(b\).
Substituted the known root \(-\frac{5}{2}\) and solved for the other root \( \frac{3}{10} \).
With both roots known, used the sum of the roots to solve for \(b\) as follows:

\left(-\frac{5}{2} + \frac{3}{10} = -\frac{b}{4}\right)\
Simplifying, we find: \left(-\frac{25}{10} + \frac{3}{10} = -\frac{22}{10} = -\frac{11}{5} \right)\.
Thus, \left(b = 4 \times \frac{11}{5} = 8.8\right).

By systematically breaking down the problem and using Vieta's formulas, we derived the unknown coefficient \(b\).

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91影视

One solution of \(4 x^{2}+b x-3=0\) is \(-\frac{5}{2} .\) Find \(b\) and the other solution.

Short Answer

Step by step solution

Identify the known values

Use Vieta's formulas

Express the sum of the roots

Express the product of the roots

Solve for the other root

Substitute to find b

Key Concepts

Vieta's formulas

Roots of a quadratic equation

Quadratic equation solutions

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