If a, b, and r are real numbers (and if a and b are not each equal to zero) then ax+with the aid of = r is called a linear equation in two variables. (The “ variables” are the x and the y.) The numbers a and b are called the coefficients of the equation ax+by means of = r. The range r is known as the regular of the equation ax + through = r.
An equation is a mathematical statement this is made up of expressions related with the aid of the same signal. for instance, 3x – five = 16 is an equation. Solving this equation, we get the price of the variable x as x = 7.
A one-step equation is an algebraic equation you may resolve in the most effective one step. You've got solved the equation when you get the variable through itself, and not using numbers in the front of it, on one side of the same signal.
Learn more about the equation here: brainly.com/question/1214333
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With addition you can do something like...
x + x=100 x=50
or
x+50=100
I'm not sure if I helped much but if you want you can explain more so I can help you with specific numbers or equations. :)
–3 • 5 • (–6) • 4
B.
–7 • (–3) • (–9) • 0
C.
–4 • (–6) • (–3) • (–5)
D.
–3 • 4 • (–2) • (–7)
Its helpful because it gives you the number to put in and to find the unit rate
Tables aid in constructing equations by facilitating the organization and visualization of mathematical data. This makes it easier to apply given parameters to equations and to understand their behavior. For instance, an equilibrium state can be visually represented in a table.
A table is incredibly helpful when constructing equations because it aids in the organization and visualization of mathematical data. Through the usage of tables, one can clearly list and categorize known values that might be used in an equation, thereby making it easier to identify what needs to be solved. For instance, if you're given multiple variables and constants in a word problem, a table can be used to order these parameters systematically so they can be more easily applied into constructing equations.
Similarly, tables contribute to expressing equations visually as they can illustrate changes in variable values, which can further assist in understanding the behavior of the equation. An equilibrium state, for instance, can be clearly italicized in a table to visually represent the point where an equation balances, which would be harder to see in text form.
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