An exponent tells us the amount of times a number is to be multiplied by itself.
An exponent tells us the amount of times a number is to be multiplied by itself.
A root is the inverse operation of exponentiation, which helps us discover which number multiplied by itself gives this result.
The square root is equal to the power of 0.5.
Choose the largest value
Find the value of n:
\( 6^n=6\cdot6\cdot6 \)?
Solve the following exercise:
\( \sqrt{x^2}= \)
Sovle:
\( 3^2+3^3 \)
\( 5+\sqrt{36}-1= \)
Choose the largest value
Let's begin by calculating the numerical value of each of the roots in the given options:
We can determine that:
5>4>3>1 Therefore, the correct answer is option A
Find the value of n:
?
We use the formula:
In the formula, we see that the power shows the number of terms that are multiplied, that is, two times
Since in the exercise we multiply 6 three times, it means that we have 3 terms.
Therefore, the power, which is n in this case, will be 3.
Solve the following exercise:
In order to simplify the given expression, we will use two laws of exponents:
a. The definition of root as an exponent:
b. The law of exponents for power of a power:
Let's start with converting the square root to an exponent using the law mentioned in a':
We'll continue using the law of exponents mentioned in b' and perform the exponent operation on the term in parentheses:
Therefore, the correct answer is answer a'.
Sovle:
Remember that according to the order of operations, exponents precede multiplication and division, which precede addition and subtraction (and parentheses always precede everything).
So first calculate the values of the terms in the power and then subtract between the results:
Therefore, the correct answer is option B.
36
To solve the expression , we need to follow the order of operations, often remembered by the acronym PEMDAS (Parentheses, Exponents, Multiplication and Division, Addition and Subtraction).
Here are the steps:
First, calculate the square root:
Substitute the square root back into the expression:
Next, perform the addition and subtraction from left to right:
Add 5 and 6:
Then subtract 1:
Finally, you obtain the solution:
\( \sqrt{441}= \)
What is the answer to the following?
\( 3^2-3^3 \)
\( 143-\sqrt{121}+18= \)
\( 81+\sqrt{81}+10= \)
Solve the following exercise and circle the correct answer:
\( 4^2-4^3= \)
The root of 441 is 21.
What is the answer to the following?
Remember that according to the order of operations, exponents come before multiplication and division, which come before addition and subtraction (and parentheses always before everything),
So first calculate the values of the terms in the power and then subtract between the results:
Therefore, the correct answer is option A.
To solve the expression , we need to follow the order of operations, which dictate that we should simplify any expressions under a square root first, followed by subtraction and addition.
Step 1: Simplify the square root:
Now, substitute back into the expression:
Step 2: Perform the subtraction:
Step 3: Perform the addition:
Therefore, the final answer is .
To solve the expression , we need to follow the order of operations, often abbreviated as PEMDAS (Parentheses, Exponents, Multiplication and Division (from left to right), Addition and Subtraction (from left to right)).
Here, the expression contains a square root, which is a type of exponent operation. Therefore, we will handle the square root first:
Now substitute the result back into the original expression:
Next, perform the addition operations from left to right:
Therefore, the final result of the expression is:
Solve the following exercise and circle the correct answer:
To solve the expression , we start by evaluating each power separately:
Calculate :
means multiplied by itself, which is .
Calculate:
means multiplied by itself three times, which is .
Next, substitute these values back into the expression:
Perform the subtraction:
Thus, the correct answer is .
-48
Solve the following exercise and circle the correct answer:
\( 5^2-4^1= \)
Solve the following exercise and circle the correct answer:
\( 5^2-4^2+2^2= \)
Solve the following exercise and circle the correct answer:
\( 6^3-6^2= \)
Solve the following exercise and circle the correct answer:
\( 7^1-7^2= \)
\( 4\times\sqrt{0.49}+4^2= \)
Solve the following exercise and circle the correct answer:
To solve the exercise , we need to follow the order of operations, specifically focusing on powers (exponents) before performing subtraction.
Step 1: Calculate . This means we multiply 5 by itself: .
Step 2: Calculate . Any number to the power of 1 is itself, so .
Step 3: Subtract the result of from : .
Step 4: Complete the subtraction: .
Thus, the correct answer is .
21
Solve the following exercise and circle the correct answer:
To solve the expression , we'll need to follow the order of operations, often remembered by the acronym PEMDAS (Parentheses, Exponents, Multiplication and Division (from left to right), Addition and Subtraction (from left to right)). Here, we only have exponents and basic arithmetic.
The final answer is .
13
Solve the following exercise and circle the correct answer:
To solve the expression , we will follow the order of operations, which in this case involves evaluating the powers before the subtraction operation.
Thus, the result of the expression is .
180
Solve the following exercise and circle the correct answer:
To solve the expression , we need to evaluate the powers first before performing the subtraction. The steps are as follows:
Thus, the correct answer is .
To solve the expression , we will follow the order of operations, which prioritizes operations inside parentheses, exponents and roots, followed by multiplication and division, and finally addition and subtraction.
1. Calculate the Square Root:
The first step is to solve the square root part of the expression. .
is a simple decimal number whose square root is , because .
So,.
2. Multiply:
Next, we multiply the result of the square root by 4:
.
3. Calculate the Power:
Evaluate .
, because .
4. Addition:
Now, add the results from the previous steps:
.
The final result of the expression is .
18.8