Question

solve the equation ax + b = 0, Where a and b are rationals and a is not 0​

Answer 1

Solution:

Required answer:

x = - b/a is the solution of the given equation.

Given Information:

Solve the equation ax + b = 0, Where a and b are rationals and a is not 0.

Explanation:

We have ax + b = 0, where a and b are rationals and a ≠ 0.

Transporting b to R.H.S. , We get

ax = -b

Since, a ≠ 0, we divide both sides by 'a'

$\longrightarrow \sf {\dfrac{ax}{a} = - \dfrac{b}{a}}$

$\longrightarrow \sf {x = - \dfrac{b}{a}}$

So,

x = - b/a is the solution of the given equation.

Note:

In the above question, the linear equations to be solved are reduced to the form ax + b = 0 to find the solution. So, the general solution of an equation ax + b = 0

Where a, b are rationals and a ≠ 0 is given by x = - b/a

Answer 2

Answer:

Solution:

Required answer:

x = - b/a is the solution of the given equation.

Given Information:

Solve the equation ax + b = 0, Where a and b are rationals and a is not 0.

Explanation:

We have ax + b = 0, where a and b are rationals and a ≠ 0.

Transporting b to R.H.S. , We get

ax = -b

Since, a ≠ 0, we divide both sides by 'a'

\begin{gathered}\longrightarrow \sf {\dfrac{ax}{a} = - \dfrac{b}{a}} \\\\ \end{gathered}

⟶

a

ax

=−

a

b

\begin{gathered}\longrightarrow \sf {x = - \dfrac{b}{a}}\\\\ \end{gathered}

⟶x=−

So,

x = - b/a is the solution of the given equation.

Note:

In the above question, the linear equations to be solved are reduced to the form ax + b = 0 to find the solution. So, the general solution of an equation ax + b = 0

Where a, b are rationals and a ≠ 0 is given by x = - b/a

Step-by-step explanation:

$0$

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