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Juan and Rob Are selling cookie dough for a school fundraiser Juan Has t Cookie dough Orders Rob has 40 cookie dough orders they have a total of 75 cookie dough orders all together

Answers

Answer 1

Answer:

Answer:

Juan has 35 orders

Step-by-step explanation:

you subtract 40 from 75 to get 35

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Five times the smaller of two consecutive numbers is added to 3 times the bigger, the result is 579. Find the smaller integer.

Answers

Here, let's represent the unknown integer with the variable "n":
5n + 3(n + 1) = 579
5n + 3n + 3 = 579
8n = 576
n = 72
The smaller integer is 72

WILL GIVE BRAINLIEST!!! 50POINTS. PLEASE EXPLAIN!What is the recursive rule for this geometric sequence? 2, 1/2, 1/8, 1/32, ... Enter your answers in the boxes.
an=___⋅an−1, a1=___

Answers

$\bf \stackrel{a_1}{2}~~,~~\stackrel{2\cdot (1)/(4)}{\cfrac{1}{2}}~~,~~\stackrel{(1)/(2)\cdot (1)/(4)}{\cfrac{1}{8}}~~,~~\stackrel{(1)/(8)\cdot (1)/(4)}{\cfrac{1}{32}}\n\n-------------------------------\n\na_n=\cfrac{1}{4}\cdot a_(n-1)\qquad \qquad a_1=2$

Answer:

an= 1/4 · an-1 a1= 2

Step-by-step explanation:

Got it correct on the test.

Percent * $3.32 = $0.32 + $0.184

Answers

The missing percentage of the given algebraic expression when calculated is; 15.18%

How to work with Percentages?

We want to find;

Percent * $3.32 = $0.32 + $0.184

First of all, let us add the terms on the right side of the equation to get;

Percent* $3.32 = $0.504

Next operation is to divide both sides by 3.32 using division property of equality to get;

Percent = 0.1518 = 15.18%

Read more about Percentages at; brainly.com/question/843074

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QuestionComplete the hypothesis about the product of two rational numbers.
Select the correct answer from each drop-down menu.
The product of two rational numbers is a rational
equivalent to the ratio of two integers
number
number because multiplying two rational numbers is
3 which is an irrational

Answers

The product of two rational numbers is a rational number.

What is a rational number?

"A rational number is a number that can be expressed as the quotient or fraction p/q of two integers, a numerator 'p' and a non-zerodenominator 'q'."

Therefore, when we are multiplying two rational numbers, their product must be a rational number.

This is because, numerators of both rational numbers are integers and denominators of both the numbers are non-zero integers.

Hence, the product is a rational number.

Learn more about a rational number here: brainly.com/question/9466779

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Solve the following problem:

Answers

Answer:

$n^(8)$

Step-by-step explanation:

Given the Quotient Rule of Exponents: $(a^(m))/(a^(n)) = a^((m-n))$ , you must subtract the exponents of each exponential expression (in fractions) before applying the Product Rule of Exponents (I will explain in a while what it means).