化简 (1-(1/x))(1 – x)

A combination of terms by the operations such as addition, subtraction, multiplication, division, etc is termed as an algebraic expression (or) a variable expression.

Examples: 2x + 4y – 7, 3x – 10, etc.

Examples of monomial expressions include 4x⁴, 2xy, 2x, 8y, etc.

Examples of binomial include 4xy + 8, xyz + x², etc.

Examples of polynomial expression include ax + by + ca, x³ + 5x + 3, etc.

Some of the examples of numeric expressions are 11 + 5, 14 ÷ 2, etc.

Some examples of a variable expression include 5x + y, 4ab + 33, etc.

(a + b) = a² + 2ab + b²

(a – b) = a² – 2ab + b²

(a + b)(a – b) = a² – b²

(x + a)(x + b) = x² + x(a + b) + ab

Examples of using these terms

If 2x²+3xy+4x+7 is an algebraic expression.

Then, 2x², 3xy, 4x and 7 are the Terms

Coefficient of term: 2 is the coefficient of x²

Constant term: 7

Variables: here x , y are variables

Factors of a term: If 2xy is a term, then its factors are 2, x and y.

Like and Unlike terms: Example of like and unlike terms:

• Like terms: 4x and 3x
• Unlike terms: 2x and 4y

We have (1-(1/x))(1 – x)

By simplifying 1-(1/x) we get

= (x-1)/x

so we can write

(1-(1/x))(1 – x)

= [(x-1)/ x ] {(1 – x)}

= {x – x² -1 +x }/x

= {-x² + 2x – 1 } / x

=- { x² – 2x + 1 } / x

= -(x – 1)²/x

We have 3x + 4(x-2) = 20

3x + 4x – 8 = 20

7x – 8 = 20

7x = 20+ 8

7x = 28

x = 28/7

x = 4

We have a = -4 and b = 5

so 7(x+4) + 3y – 8

Put the value of a and b in above expression

= 7(x+4) + 3y – 8

= 7 (-4 + 4) + 3(5) – 8

= 7 (0) + 15 – 8

= 0 + 7

= 7

(21x³ – 7)/(3x – 1)

= [7 (3x³ – 1 )] / (3x-1)

= [ 7 {(3x)³ – (1)³ ] / (3x-1)

= [7 (3x-1)(9x² +1 + 3x)] / (3x-1) {a³ – b³ = (a – b)(a² + ab + b²)}

= 7 (9x² +1 + 3x)

= 63x² + 7 + 21x

= 63x² + 21x + 7

We have

5x – 48 = x + 2x

5x – 48 = 3x

5x – 3x = 48

2x = 48

x = 48/2

x = 24