Converting (2x1)+(6 x 1/1000) to Standard Form
In mathematics, standard form is a way of expressing numbers in a compact and simplified form. In this article, we will explore how to convert the expression (2x1)+(6 x 1/1000)
to its standard form.
Understanding the Expression
Let's break down the given expression:
(2x1)+(6 x 1/1000)
This expression consists of two parts: 2x1
and 6 x 1/1000
. We'll analyze each part separately.
Simplifying 2x1
The first part, 2x1
, is a straightforward multiplication:
2x1 = 2
So, we are left with 2
.
Simplifying 6 x 1/1000
The second part, 6 x 1/1000
, involves multiplying 6
by 1/1000
. To simplify this, we can rewrite 1/1000
as a decimal:
1/1000 = 0.001
Now, multiply 6
by 0.001
:
6 x 0.001 = 0.006
Combining the Parts
Now that we have simplified both parts, we can combine them:
(2) + (0.006)
Standard Form
In standard form, a number is written in the format a × 10^n
, where a
is a number between 1 and 10, and n
is an integer.
To write our result in standard form, we can rewrite the decimal part as a power of 10:
0.006 = 6 × 10^(-3)
Now, we can combine the two parts in standard form:
(2) + (6 × 10^(-3))
And that's our final answer!