(3+2i)-(3+2i)
To simplify the expression ( \frac{6a}{4} + 2 ), first simplify ( \frac{6a}{4} ) to ( \frac{3a}{2} ). Therefore, the expression becomes ( \frac{3a}{2} + 2 ). This can also be written as ( \frac{3a}{2} + \frac{4}{2} ), resulting in ( \frac{3a + 4}{2} ).
is that ment to be a > sign? well if it is3a>4a-5 (-4a)-a>-5 then just inverta>5
To simplify the expression (2a + a), you can combine like terms. Since both terms involve the variable (a), you can add their coefficients: (2 + 1 = 3). Thus, the simplified expression is (3a).
To simplify the expression ( b + 5a + 7 - 3a - 2 + 2b ), first combine like terms. The ( b ) terms are ( b + 2b = 3b ), and the ( a ) terms are ( 5a - 3a = 2a ). For the constant terms, combine ( 7 - 2 = 5 ). Thus, the simplified expression is ( 3b + 2a + 5 ).
1 x1 =1 2x2=4 and it goes on and on bye see you later
3A + 9B = 3(A + 3B)
Add them together: 3a+4a-a = 6a
a + 7b + 2c
To simplify the expression 3a^2 * 4a^5, you can first multiply the coefficients 3 and 4 to get 12. Then, you add the exponents of 'a', which gives you a total exponent of 7. Therefore, the simplified expression is 12a^7.
To simplify the expression (4a + 3(a^2)), you first distribute the (3) to (a^2), resulting in (4a + 3a^2). The expression cannot be simplified further since it consists of terms of different degrees. Therefore, the simplified form is (3a^2 + 4a).
a + 3a - 2 + 3a. Add the a + 3a + 3a = 7a. You can't combine the -2 & 7a so the solution is: 7a - 2.
To solve the expression (2(3a + 4) - (a - 6) - (3 - a)^2 + 4(5 - a)), first, distribute and simplify each term. Start by expanding the brackets: (2(3a + 4) = 6a + 8), (- (a - 6) = -a + 6), and (- (3 - a)^2 = - (9 - 6a + a^2) = -9 + 6a - a^2). Combine all the terms, collecting like terms to simplify the expression to its final form.