1+1-1
An example of an algebraic expression is: 4x=24. it is basicaly an expression with 1 or more operations, a variable, and an equal sign.
To simplify the expression (2x + 23 - 2 - 1), first combine the constant terms: (23 - 2 - 1 = 20). Thus, the expression simplifies to (2x + 20).
The expression ((6 - 7)3) simplifies as follows: first, calculate (6 - 7), which equals (-1). Then, multiply (-1) by (3), resulting in (-3). Therefore, the expression is equal to (-3).
3 (x2 + 1)
The expression for 8 divided by the sum of 3 and 1 can be written as ( \frac{8}{3 + 1} ). First, you calculate the sum in the denominator: ( 3 + 1 = 4 ). Thus, the expression simplifies to ( \frac{8}{4} ), which equals 2.
-1+6
An example of an algebraic expression is: 4x=24. it is basicaly an expression with 1 or more operations, a variable, and an equal sign.
To simplify the expression (2x + 23 - 2 - 1), first combine the constant terms: (23 - 2 - 1 = 20). Thus, the expression simplifies to (2x + 20).
The expression ((6 - 7)3) simplifies as follows: first, calculate (6 - 7), which equals (-1). Then, multiply (-1) by (3), resulting in (-3). Therefore, the expression is equal to (-3).
3 (x2 + 1)
Two eighths simplifies to 1/4, which is 0.25
Yes - it simplifies to 2 1/4
The expression for 8 divided by the sum of 3 and 1 can be written as ( \frac{8}{3 + 1} ). First, you calculate the sum in the denominator: ( 3 + 1 = 4 ). Thus, the expression simplifies to ( \frac{8}{4} ), which equals 2.
The four fundamental operations are: 1. addition 2. subtraction 3. multiplication 4. division
The fundamental math operations: 1. Multiplication 2. Division 3. Addition 4. Subtraction The operator performs the operations of the expression in the order from the left to the right.
To make 24 using the numbers 1, 9, 2, and 2, you can use the following expression: (9 - 2) × (2 + 1). This simplifies to 7 × 3, which equals 21. However, we can also adjust the operations, like using 9 × 2 + 2 - 1, which gives 18 + 2 - 1 = 19, so finding a combination that yields exactly 24 may require a different approach or set of operations.
Distributive Property