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what is 3.2x10^4+1.95x10^6 in scientific notation?
Answers
Answered by
GPT 3.5
To find the sum of these two numbers in scientific notation, we need to convert them to the same power of 10.
First, let's convert 3.2x10^4 to the same power of 10 as 1.95x10^6.
3.2x10^4 = 0.32x10^5 (since 10^5 is 10 times greater than 10^4)
Now, we can add the two numbers in scientific notation:
0.32x10^5 + 1.95x10^6 = 2.27x10^6
Therefore, the sum of 3.2x10^4 and 1.95x10^6 in scientific notation is 2.27x10^6.
First, let's convert 3.2x10^4 to the same power of 10 as 1.95x10^6.
3.2x10^4 = 0.32x10^5 (since 10^5 is 10 times greater than 10^4)
Now, we can add the two numbers in scientific notation:
0.32x10^5 + 1.95x10^6 = 2.27x10^6
Therefore, the sum of 3.2x10^4 and 1.95x10^6 in scientific notation is 2.27x10^6.
Answered by
GPT 3.5
I apologize for the mistake. Let's try again.
To add these two numbers in scientific notation, we need to convert them to the same power of 10.
3.2x10^4 + 1.95x10^6 = (3.2x10^4) + (1.95x10^6)
To make the powers of 10 the same, we can rewrite 3.2x10^4 as 0.032x10^6 (since 10^6 is 100 times larger than 10^4).
Now we can add the two numbers:
0.032x10^6 + 1.95x10^6 = 1.982x10^6
Therefore, 3.2x10^4 + 1.95x10^6 in scientific notation is 1.982x10^6.
To add these two numbers in scientific notation, we need to convert them to the same power of 10.
3.2x10^4 + 1.95x10^6 = (3.2x10^4) + (1.95x10^6)
To make the powers of 10 the same, we can rewrite 3.2x10^4 as 0.032x10^6 (since 10^6 is 100 times larger than 10^4).
Now we can add the two numbers:
0.032x10^6 + 1.95x10^6 = 1.982x10^6
Therefore, 3.2x10^4 + 1.95x10^6 in scientific notation is 1.982x10^6.
Answered by
GPT 3.5
To find the difference between these two numbers in scientific notation, we need to convert them to the same power of 10.
4.82x10^6 - 4.82x20^12 = (4.82x10^6) - (4.82x20^12)
To make the powers of 10 the same, we can rewrite 4.82x10^6 as 0.482x10^7 (since 10^7 is 10 times larger than 10^6).
Now we can subtract the two numbers:
0.482x10^7 - 4.82x20^12
However, it seems there might be a typo in the expression you provided. The second term, 4.82x20^12, should perhaps be written as 4.82x10^12.
Assuming the correct expression is 4.82x10^12, we can perform the subtraction:
0.482x10^7 - 4.82x10^12 = -4.82x10^12
Therefore, the difference between 4.82x10^6 and 4.82x10^12 in scientific notation is -4.82x10^12.
4.82x10^6 - 4.82x20^12 = (4.82x10^6) - (4.82x20^12)
To make the powers of 10 the same, we can rewrite 4.82x10^6 as 0.482x10^7 (since 10^7 is 10 times larger than 10^6).
Now we can subtract the two numbers:
0.482x10^7 - 4.82x20^12
However, it seems there might be a typo in the expression you provided. The second term, 4.82x20^12, should perhaps be written as 4.82x10^12.
Assuming the correct expression is 4.82x10^12, we can perform the subtraction:
0.482x10^7 - 4.82x10^12 = -4.82x10^12
Therefore, the difference between 4.82x10^6 and 4.82x10^12 in scientific notation is -4.82x10^12.
Answered by
GPT 3.5
To find the difference between these two numbers in scientific notation, we can subtract the coefficients while keeping the same power of 10.
4.82x10^6 - 4.82x10^12 = (4.82 - 4.82)x10^6 = 0x10^6
The coefficient is zero, and any number multiplied by zero is zero. Therefore, the difference between 4.82x10^6 and 4.82x10^12 is 0 in scientific notation.
4.82x10^6 - 4.82x10^12 = (4.82 - 4.82)x10^6 = 0x10^6
The coefficient is zero, and any number multiplied by zero is zero. Therefore, the difference between 4.82x10^6 and 4.82x10^12 is 0 in scientific notation.
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