21,935,483.87 rounded to the nearest million is 22,000,000.00
First you find the common deoninator.
Step 1: Reduce (simplify) entered fractions to lowest terms, if the case:Fraction: 5 / 6 it's already reduced to lowest terms
Fraction: 11 / 12 it's already reduced to lowest terms
Step 2: Calculate LCM (lowest common multiple) of the reduced fractions' denominators, it will be the common denominator of the compared fractions:Denominator 6, factored = 2 * 3
Denominator 12, factored = 22<span> * 3</span>
LCM (6, 12) = 22<span> * 3 = 12</span>Step 3: Calculate each fraction's expanding number (LCM divided by each fraction's denominator):For fraction: 5 / 6 is 12 : 6 = (22<span> * 3) : 6 = 2</span>
For fraction: 11 / 12 is 12 : 12 = (22<span> * 3) : 12 = 1</span>
Step 4: Expand fractions to bring them to the common denominator (LCM):5 / 6 = (2 * 5) / (2 * 6) = 10 / 12
<span>11 / 12 = (1 * 11) / (1 * 12) = 11 / 12</span>
What are you supposed to solve
Answer:
- We are given:- y=2/x
- We need to find the slope of the curve at x=a.
Step-by-step explanation:
Solution,
We use the slope formula, setting x=a :
<em><u>T</u></em><em><u>h</u></em><em><u>e</u></em><em><u>r</u></em><em><u>e</u></em><em><u>f</u></em><em><u>o</u></em><em><u>r</u></em><em><u>e</u></em><em><u>,</u></em><em><u> </u></em><em><u>T</u></em><em><u>h</u></em><em><u>e</u></em><em><u> </u></em><em><u>s</u></em><em><u>l</u></em><em><u>o</u></em><em><u>p</u></em><em><u>e</u></em><em><u> </u></em><em><u>o</u></em><em><u>f</u></em><em><u> </u></em><em><u>t</u></em><em><u>h</u></em><em><u>e</u></em><em><u> </u></em><em><u>c</u></em><em><u>u</u></em><em><u>r</u></em><em><u>v</u></em><em><u>e</u></em><em><u> </u></em><em><u>y</u></em><em><u>=</u></em><em><u>2</u></em><em><u>/</u></em><em><u>x</u></em><em><u> </u></em><em><u>a</u></em><em><u>t</u></em><em><u> </u></em><em><u>x</u></em><em><u>=</u></em><em><u>a</u></em><em><u> </u></em><em><u>i</u></em><em><u>s</u></em><em><u> </u></em><em><u>-</u></em><em><u>2</u></em><em><u>/</u></em><em><u>a</u></em><em><u>^</u></em><em><u>2</u></em><em><u>.</u></em>