If: 40y = 320
Then: y = 8
The statement "equals" means that they are equal. If the word "equals" and its symbol " = " are a true statement, then the two sides are truly equal in every way.
It is an equation of: 5x+3 = 28 and its solution is x = 5 5 times x plus 3 equals 28. Subtract 3 from both sides of the equation. 5 times x equals 25. Divide both sides of the equation by 5. x equals 5. (stop)
Equality. If they are ALWAYS equal then the equation is an identity.
Equal quantities may be added to both sides of a linear equation.
Divide both sides by 6: 3 - r = 0, so r = 3 satisfies the equation.
Equal sums on both sides of the equation would be 29 + 29 = 58
The statement "equals" means that they are equal. If the word "equals" and its symbol " = " are a true statement, then the two sides are truly equal in every way.
The property is: If equals are subtracted from equals, the results are equal.
It is an equation of: 5x+3 = 28 and its solution is x = 5 5 times x plus 3 equals 28. Subtract 3 from both sides of the equation. 5 times x equals 25. Divide both sides of the equation by 5. x equals 5. (stop)
If you're asking what the value for y is, then the answer could be any number. Both sides of the equation are equal to y+8.
X - 5 = 17 Add 5 to both sides of the equation: X = 22
Never. By definition, the two sides of an equation are equal.
I think its a property in which both sides of an equation are equal either by adding, subtracting, multiplication, or division.
Equality. If they are ALWAYS equal then the equation is an identity.
The 'answer' is the number that 'c' must be, if 5c is really the same as -75.In order to find out what number that is, you could use 'algebra'.First, write the equation, so that you can look at it:5c = -75Now, use the law of algebra that says: "If equals are divided by equals,then the quotients are equal".The left and right sides of your equation are equals. Divide them both by 5,and that law says that the quotients on both sides will be equal:c = -15
Given that ab = ba and bc = cb We can arrive at abbc = cbba by adding equal quantities to both sides of the equation By the cancellation law you're allowed to drop the bb from both sides of the equation to end up with ac = ca
Equal quantities may be added to both sides of a linear equation.