To combine the integers 2, 3, 5, and 7 in two different ways, we can use addition and multiplication.
Thus, the results of the expressions are 60 and 31, respectively.
To solve the expression (10.8x - 3.5x \cdot 131.4), first calculate the multiplication: (3.5 \cdot 131.4 = 459.9). Then, rewrite the expression as (10.8x - 459.9x). Combine the terms to get (-449.1x). The simplified expression is (-449.1x).
To solve the expression (8x^2 - 24 - 3x^2 - 9), first combine like terms. Combine the (x^2) terms: (8x^2 - 3x^2 = 5x^2). Then, combine the constant terms: (-24 - 9 = -33). The simplified expression is (5x^2 - 33).
To solve the expression (-3 + 6a + 29a - 15), first, combine like terms. The terms involving (a) are (6a) and (29a), which add up to (35a). The constant terms are (-3) and (-15), which combine to (-18). Thus, the simplified expression is (35a - 18).
To solve the expression ( 8x + 4 - 5x - 11 ), first combine like terms. Combine the ( x ) terms: ( 8x - 5x = 3x ). Then combine the constant terms: ( 4 - 11 = -7 ). The simplified expression is ( 3x - 7 ).
To solve the expression (2x - 9y + 7x + 20y), first combine like terms. Combine the (x) terms: (2x + 7x = 9x), and combine the (y) terms: (-9y + 20y = 11y). Therefore, the simplified expression is (9x + 11y).
To solve the expression (10.8x - 3.5x \cdot 131.4), first calculate the multiplication: (3.5 \cdot 131.4 = 459.9). Then, rewrite the expression as (10.8x - 459.9x). Combine the terms to get (-449.1x). The simplified expression is (-449.1x).
To solve the expression (-3 + 6a + 29a - 15), first, combine like terms. The terms involving (a) are (6a) and (29a), which add up to (35a). The constant terms are (-3) and (-15), which combine to (-18). Thus, the simplified expression is (35a - 18).
To solve the expression (8x^2 - 24 - 3x^2 - 9), first combine like terms. Combine the (x^2) terms: (8x^2 - 3x^2 = 5x^2). Then, combine the constant terms: (-24 - 9 = -33). The simplified expression is (5x^2 - 33).
To solve the expression ( 8x + 4 - 5x - 11 ), first combine like terms. Combine the ( x ) terms: ( 8x - 5x = 3x ). Then combine the constant terms: ( 4 - 11 = -7 ). The simplified expression is ( 3x - 7 ).
To solve the expression (2x - 9y + 7x + 20y), first combine like terms. Combine the (x) terms: (2x + 7x = 9x), and combine the (y) terms: (-9y + 20y = 11y). Therefore, the simplified expression is (9x + 11y).
To solve the expression (5v - 34 + 26), first combine the constants: (-34 + 26 = -8). Thus, the expression simplifies to (5v - 8).
To solve the expression (7qt - 3pt + 1pt), first combine like terms. The term (-3pt) and (+1pt) can be combined to yield (-2pt). Thus, the simplified expression becomes (7qt - 2pt).
There is no such thing as "solving integers". You can solve an equation, which means finding all the unknowns in that equation, but you can't solve an integer.
To solve the expression -6n - 2n + 16, combine the like terms (-6n and -2n). This results in -8n + 16. Therefore, the simplified expression is -8n + 16.
To solve the expression (-33 + 58g - 73), first combine the constant terms: (-33 - 73 = -106). Thus, the simplified expression is (-106 + 58g). This represents a linear expression in terms of (g). If you need to solve for (g), additional information or an equation would be necessary.
To solve an expression that is not simplified, first, combine like terms by identifying and grouping similar variables or constants. Then, apply arithmetic operations (addition, subtraction, multiplication, division) as appropriate to simplify the expression further. If necessary, factor the expression or use algebraic identities to reduce it to a simpler form. Always check your final answer to ensure it is in its simplest possible state.
To solve the expression (2a + 6b - 2a - b), you first combine like terms. The (2a) and (-2a) cancel each other out, leaving you with (6b - b). Simplifying (6b - b) gives you (5b). Therefore, the simplified result is (5b).