Add these expressions (3x + 15) + (4x + 13)

Add these expressions (x + 5) + (2x + 10)

Given Expression:
(x + 5) + (2x + 10)
>>> First step is to reduce the given expression without any parenthesis. Then:
(x + 5) + (2x + 10)
= x + 5 + 2x +10
>>> second step is to reduce the like terms by performing operations in between them.
Like terms are x,2x and 5,10.
Then, the Expression becomes:
= x + 5 + 2x + 10
= 3x + 15.
* Hence, the expression (x + 5) + (2x + 10) becomes 3x + 15 after it's evaluation.

The simplest form of this expression is? 4x - 6a + 5a - 2x

Given expression:
4x - 6a + 5a - 2x
>>> Like terms present in the expression are 4x, -2x and -6a, 5a.
>>>Perform reduction on the like terms, then
4x - 6a + 5a - 2x
= (4x - 2x) + (-6a + 5a)
= (2x) + (-1a)
=2x - 1a.
Hence, the expression  4x - 6a + 5a - 2x becomes 2x - a after evaluation.

Simplify the expression: 7 + 3(1 - 2x)

Given Expression:
                               7 + 3(1 - 2x)
>>>First step is to evaluate 3(1 - 2x). Since, it is in the form of a(b+ c) we can apply Distributive law which produces ab+ ac as a result. Hence, By applying the Distributive Law to 3(1 - 2x) yields:
3(1 - 2x)
= 
= (3) + (-6x)
= 3-6x.
hence, 3(1-2x) becomes 3-6x after it's expansion.
>>> second step is to reduce the expression by reducing like terms:
7 + 3(1 - 2x)
= 7 + 3 -6x
= 10 -6x.
* Hence, the expression evaluation of  7 + 3(1 - 2x) yields 10 - 6x.

Add 2(x + 8) + 6x

Given Expression:
2(x + 8) + 6x
>> First step is to evaluate 2(x + 8). I t is in the form a(b+ c) then, we can apply Distributive Law which produces ab+ ac. Similarly, By applying the Distributive Law to 2(x + 8) :
2(x + 8)
= 
= 8x + 16.
Hence, 2(x+ 8) ~~ 8x+ 16.
>>> Second step is to reduce the like terms.
2(x + 8) + 6x
= 2x + 16 + 6x
= 8x + 16.
* Hence, the expression evaluation of 2(x + 8) + 6x becomes 8x +16.

Total terms are in the expression below expression is? 5a + 7a – 8

Given Expression:
5a + 7a – 8
In the Given expression we can see that there are 3 terms which are differentiated by 2 operators in between.
* The terms present in the given expression are 5a, 7a, -8.
Hence, the given Expression has exactly 3 terms in it.

Use the distributive property to expand the expression. 2(−2b+6)

Given Expression:
2(−2b+6)
Since, it is in the form a(b+ c) we can apply Distribution Law which produces ab + ac as result.
Similarly, By applying the distributive law to 2(−2b+6) :
2(−2b+6)
= 
= -4b +12.
Hence, The expression 2(−2b+6) yields -4b +12 after it's expansion.

8y + 12 - 2z
for y = 4 and z = 2

Identify the following is equivalent to 5(2x+6)

Given Expression:
5(2x+6)
Since, it is in the form a(b+ c) we can apply distributive law which produces ab+ ac as a result.
Similarly, By applying the Distributive law to 5(2x+6) :
5(2x+6)
= 
= 10x + 30.
Hence, The expression 5(2x+6) yields 10x +30 after it's expansion.

There were 47 frogs in a pond. f of the frogs hopped away. Choose the expression that represents this.

Evaluate the expression.   Let g = 3    h = 9
4h + 2g + 4

Simplify the expression 11(9+d)

Given Expression:
11(9+d)
Since, it is in  the form a(b +c) we can apply Distributive Law which produces ab+ ac as a result.
Similarly, by applying the distributive law to 11(9+d) :
11(9+d)
= 
= 99 + 11d.
Hence, the expression 11(9+d) yields 99 + 11d after it's expansion.

The expression 7h + 1.50d can be used to find the total earnings after h hours and d deliveries have been made.  Sally make after working 10 hours and making 3 deliveries total is ?

Use the distributive property to simplify the expression below:
−2(6n+3)

Given Expression:
−2(6n+3)
Distributive law states that every attribute inside the parenthesis can have same access of the attributes present outside the parenthesis.
Example: a(b+ c) yields ab + ac.
Hence, By applying Distributive Law to −2(6n+3) :
−2(6n+3)
=
=(-12n) + (-6)
= -12n - 6.
Hence, from distributive law −2(6n+3) yields -12n - 6.

Evaluate 8a - b     if a = 10   and   b = 6.

6a - 3d
when a = 1, d = 2