Parentheses separate calculations to be performed independent of a larger equation. The resulting quantity then becomes subject to whatever other calculation is established outside the parenthese within that equation. Parentheses within parentheses work the same way, beginning with the most interior groupings until ultimately everything inside the outer parentheses becomes a single quantity.
Parentheses and brackets work the same in math as they do in writing -- use them to group ideas.
To reference Jasper's work from 2003 in APA style, you would include the author's last name (Jasper) followed by the publication year (2003) in parentheses within the text. In the reference list, you would list Jasper as the author, followed by the publication year in parentheses, the title of the work, and the publication information.
It depends what subject you use it for. For example, if you use parentheses in terms of language arts then, it would be the same thing no matter how you use it. In that case, it means you want to add extra information that isn't necessarily essential to the meaning. It can also be the definition of a term. If you use parentheses in math, then it can mean to multiply. It can also mean to work what is inside the parentheses first.
It really depends on the type of equation. Sometimes you can know, from experience with similar equations. But in many cases, you have to actually do the work of trying to solve the equation.
Eat less and exercise more - simple equation and no shortcuts will work.
The equation for force using work is: Work = Force x Distance. This equation relates the amount of work done to the force applied over a certain distance.
Do you mean a question like 20/5/2? Without any parentheses, the rule would be to work from left to right, dividing 20 by 5 first: (20/5)/2 = 4/2 = 2. If there were parentheses telling us to do the second division first, the answer would be different: 20/(5/2) = 20/2.5 = 8.
The equation for work is work = force × displacement × cosθ, where θ is the angle between the force and displacement vectors. If you want to calculate work done over a specific time period, you would need to know the force exerted over that time period and the corresponding displacement.
4 (t + 3) = 20Eliminate parentheses on the left side:4t + 12 = 20Subtract 12 from each side of the equation:4t = 8Now divide each side of the equation by 4,and you have the solution.==================================Another way to approach it:4 (t + 3) = 20Divide each side of the equation by 4 :t + 3 = 5Now subtract 3 from each side,and you have the solution.This approach seems easier.
To work out the equation of a sequence, you should first look at the differences in the sequence. In this case, the differences between the numbers are -2, -2, -2. Thus the equation for the sequence is x-2n To work out x, you need to find what the "0th term" would be, or the term that would come before 4. In this case, it would be 4+2=6. Therefore, the equation for the nth term is 6-2n
The definition of work is (force) times (distance). If you mean you're given the equation and you need to solve it for 'work', then you only need to multiply both sides of the equation by 'time', and you'll have (power) x (time) = (work)