Chapter 8.4, Problem 25IP

To determine

The solution of the equation $1.5(d+3.5)=-2.4$ .

Answer to Problem 25IP

  $d=-5.1$

Explanation of Solution

Given:

The equation, $1.5(d+3.5)=-2.4$ .

Concept Used:

Distributive property:

Left Distributive property: $a\left(b\pm c\right)=a\cdot b\pm a\cdot c$

Right Distributive property: $\left(a\pm b\right)c=a\cdot c\pm b\cdot c$

• To get rid of a number in addition from one side, subtract the same number from both sides of equal sign.
• To get rid of a number in subtraction from one side, add the same number both sides of equal sign.
• To get rid of a number in multiplication from one side, divide the same number from both sides of equal sign.
• To get rid of a number in division from one side, multiply the same number both sides of equal sign.

Rules of Addition/ Subtraction:

• Two numbers with similar sign always get added and the resulting number will carry the similar sign.
• Two numbers with opposite signs always get subtracted and the resulting number will carry the sign of larger number.

Rules of Multiplication/ Division:

• The product/quotient of two similar sign numbers is always positive.
• The product/quotient of two numbers with opposite signs is always negative.

Calculation:

In order to solve the given equation $1.5(d+3.5)=-2.4$ for the unknown variable, first using left Distributive property on left side of the equation and then isolate the variable term d on one side by performing some basic algebraic operations to get rid of the other numbers and terms associated with it.

Here to isolate d on left side, first subtract 5.25 from both sides and then divide both sides by 1.5 and then simplify further as shown below,

  $\begin{array}{l}1.5(d+3.5)=-2.4\\ 1.5\cdot d+1.5\cdot 3.5=-2.4\\ 1.5d+5.25=-2.4\\ 1.5d+5.25-5.25=-2.4-5.25\\ 1.5d=-7.65\\ \frac{1.5d}{1.5}=\frac{-7.65}{1.5}\\ d=-5.1\end{array}$

Thus, the solution of the given equation is $d=-5.1$ .