(6/7 x 4p + 3/4 - 8/19) (5p - 9x .88 x 0 /4) x 10%
To simplify and solve the expression, we will break it down step by step:
Step 1: Evaluate the expression within the parentheses
We have two sets of parentheses in the expression. Let's start with the first one:
(6/7 x 4p + 3/4 - 8/19) (5p - 9x .88 x 0 /4) x 10%
To simplify the expression in the first set of parentheses, we'll apply the order of operations. First, let's simplify the multiplication:
6/7 x 4p = (6 x 4p) / 7 = 24p / 7
Now, let's subtract the fractions:
24p / 7 + 3/4 - 8/19
To add or subtract fractions, we need to find a common denominator. In this case, the common denominator is 7 x 4 x 19 = 532.
(24p / 7)(76/76) + (3/4)(133/133) - (8/19)(28/28)
This gives us:
(1824p / 532) + (399 / 532) - (224 / 532)
Now we can combine the numerators:
1824p + 399 - 224 / 532
Step 2: Simplify the expression in the second set of parentheses
Next, let's simplify the expression in the second set of parentheses:
5p - 9x .88 x 0 / 4
We have a multiplication and a division in this expression. Multiplication and division should be applied from left to right, so let's start with the multiplication:
5p - (9x)(.88)(0) / 4
Since any number multiplied by zero is zero, we can simplify it to:
5p - 0 / 4
Now we have:
5p - 0
And finally:
5p
Step 3: Apply the final operation - multiplication by 10%
Now that we have simplified both sets of parentheses, we need to multiply the two simplified expressions by 10% (which is equivalent to multiplying by 0.1):
(1824p + 399 - 224 / 532)(5p)(0.1)
Now, let's simplify it further:
(1824p + 399 - 224) (5p)(0.1)
Combining like terms within the parentheses:
(1824p + 175) (5p)(0.1)
Multiplying the expressions:
9120p^2 + 875p
And finally:
9120p^2 + 875p