The simplify of 2 times 2 take away 2 equals 2. This is a math problem.
The given expression can be simplified to: 2x-2
In algebra collect like terms means combining the like terms together. It can be done with the help of variables, powers and the terms which have like properties. When collecting like terms the corresponding sign of a particular number will carry with the term.For Example:Combine the like terms and simplify the expression 2x + 8y +2 + 4x + y + 1SOLUTION:The given expression is 2x + 8y +2 + 4x + y + 1The terms in the given expression is 2x, 8y, 2 , 4x, y, 1.Now combine the like terms with the help of variables.Collect 2x and 4x together, 8y and y together and the constants 2 and 1 together.The simplified answer for the given expression is= 2x + 8y +2 + 4x + y + 1= 2x+4x +8y +y + 2+1= 6x + 9y +3
I assume you wish to simplify the expression (x - 2)/(3x + 9) . (2x + 6)/(2x - 4) = (x - 2)(2x + 6) / [(3x + 9)(2x - 4)] = 2(x - 2)(x + 3) / [6(x + 3)(x - 2)] = 1/3.
Simplify 4x + 3 = 2x + 8 2x = 5 x =2½
3 + 3 + 2x = 0 6 + 2x = 0 2x = -6 x = -6/2 x = -3
The simplest form of 2 times 2 take 2 equals 2. his is taught in math class.
To simplify the expression (4x^3 - 2x^5), you can factor out the common term, which is (2x^3). This results in the expression (2x^3(2 - x^2)). Thus, the equivalent expression is (2x^3(2 - x^2)).
To simplify the expression -2x - 2 - 3x10, first calculate the multiplication: 3x10 = 30. Then, the expression becomes -2x - 2 - 30. Combining the constant terms gives -2x - 32. Thus, the simplified expression is -2x - 32.
It can be factored as 18(5-2x^2)
To simplify the expression (2x + 23 - 2 - 1), first combine the constant terms: (23 - 2 - 1 = 20). Thus, the expression simplifies to (2x + 20).
To simplify the expression ( 13x^2 + 2x - 7 ), you simply combine the terms. Since there are no like terms to combine, the expression remains ( 13x^2 + 2x - 7 ).
To simplify the expression (8x - 3(2 + 2x)), first distribute the (-3) across the terms inside the parentheses: [ 8x - 3 \cdot 2 - 3 \cdot 2x = 8x - 6 - 6x. ] Next, combine like terms: [ (8x - 6x) - 6 = 2x - 6. ] Thus, the simplified expression is (2x - 6).
To simplify the expression (2x^3 + 23x), you can factor out the common term, which is (x). This gives you (x(2x^2 + 23)). The expression is now simplified, showing the common factor clearly.
To simplify the expression (2x + 3y - 5x^2 - 10y + 7x^2), first combine like terms. The (x^2) terms combine to (2x^2) (from (-5x^2 + 7x^2)), and the (y) terms combine to (-7y) (from (3y - 10y)). Thus, the equivalent expression is (2x^2 + 2x - 7y).
To simplify the expression ( 2x \cdot 154 \cdot 4x - 11 ), first multiply ( 2x ) and ( 4x ) to get ( 8x^2 ). Then multiply ( 8x^2 ) by ( 154 ) to get ( 1232x^2 ). The expression simplifies to ( 1232x^2 - 11 ).
To simplify the expression ((1x^2 - 2x + 4) + (2x + 1) - (x^2 + 5)), first combine like terms. The (x^2) terms give (1x^2 - 1x^2 = 0). The (x) terms yield (-2x + 2x = 0), and the constant terms combine to (4 + 1 - 5 = 0). Thus, the simplified expression is (0).
The given expression can be simplified to: 2x-2