The solutions of (93 × p) + 84 = 8593 times p plus 84 equals 85 yields p = 84/8500 or 1/8593.
We can write the equation as follows;
(93 × p) + 84 = (8593 × p) + 84 = 85
We can solve the equation in parts as follows;
(93 × p) + 84 = (8593 × p) + 84
93p + 84 = 8593p
93p - 8593p = -84
-8500p = -84
p = 84/8500
Also;
(8593 × p) + 84 = 85
8593p + 84 = 85
p = 85 - 84/8593
p = 1/8593
Hence p = 84/8500 or 1/8593
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The normal distribution common core algebra 2 example is solve for the calculation that leads to the answer in x₁ = 66 inches (image attached)
<h3>What is this algebra about?</h3>
Algebra is known to be an aspect of mathematics that handles symbols and the laws for manipulating the given symbols.
Note that x₁ = 66 inches.
= 66 - 62/ 3.2
= 1.25
Therefore the answer is 1.25.
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The length of the base of the isosceles triangle is: 27 units long.
<h3>What is an isosceles Triangle?</h3>
A triangle with two equal legs and a base is called an isosceles triangle.
Thus:
Let x represent the length of each of the equal legs of the isosceles triangle.
Therefore:
The length of the base = 1 1/2(x) = 1.5x units
Perimeter = 63
Therefore:
x + x + 1.5x = 63
3.5x = 63
x = 63/3.5
x = 18
The length of the base = 1.5x units
Plug in the value of x
The length of the base = 1.5(18) = 27 units
Therefore, the length of the base of the isosceles triangle is: 27 units long.
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Answer:
b. The number of digits in a randomly selected row until a 3 is found.
Explanation:
A random variable often used in statistics and probability, is a variable that has its possible values as numerical outcomes of a random experiment or phenomenon. It is usually denoted by a capital letter, such as X.
In statistics and probability, random variables are either continuous or discrete.
1. A continuous random variable is a variable that has its possible values as an infinite value, meaning it cannot be counted.
2. A discrete random variable is a variable that has its possible values as a finite value, meaning it can be counted.
Also, any random variable that meets certain conditions defined in a research study.
Hence, an example of a geometric random variables is the number of digits in a randomly selected row until a 3 is found.
Answer:
Which one is the underlined word?
Explanation:
I couldn't see the underlined word. Please rewrite the question in order for me to help you. (Tip: use Ctrl+U to write an underlined word.)
