Learn how to use the Algebra Calculator to check your answers to algebra problems.
Example Problem
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Solve 2x+3=15.Check Answer
x=6How to Check Your Answer with Algebra Calculator
First go to the Algebra Calculator main page.
Type the following:
- First type the equation 2x+3=15.
- Then type the @ symbol.
- Then type x=6.
Clickable Demo
Try entering 2x+3=15 @ x=6 into the text box.After you enter the expression, Algebra Calculator will plug x=6 in for the equation 2x+3=15: 2(6)+3 = 15.
The calculator prints 'True' to let you know that the answer is right.
More Examples
Here are more examples of how to check your answers with Algebra Calculator.Feel free to try them now.- For x+6=2x+3, check (correct) solution x=3: x+6=2x+3 @ x=3
- For x+6=2x+3, check (wrong) solution x=2: x+6=2x+3 @ x=2
- For system of equations x+y=8 and y=x+2, check (correct) solution x=3, y=5: x+y=8 and y=x+2 @ x=3, y=5
- For 3xy=18, check (correct) solution x=2, y=3: 3xy=18 @ x=2, y=3
Need Help?
Please feel free to Ask MathPapa if you run into problems.Related Articles
Log calculator finds the logarithm function result (can be called exponent) from the given base number and a real number.
Logarithm
Logarithm is considered to be one of the basic concepts in mathematics.There are plenty of definitions, starting from really complicated and ending up with rather simple ones.In order to answer a question, what a logarithm is, let's take a look at the table below:
21 | 22 | 23 | 24 | 25 | 26 |
2 | 4 | 8 | 16 | 32 | 64 |
This is the table in which we can see the values of two squared, two cubed, and so on.This is an operation in mathematics, known as exponentiation.If we look at the numbers at the bottom line, we can try to find the power value to which 2 must be raised to get this number.For example, to get 16, it is necessary to raise two to the fourth power.And to get a 64, you need to raise two to the sixth power.
Therefore, logarithm is the exponent to which it is necessary to raise a fixed number (which is called the base), to get the number y.In other words, a logarithm can be represented as the following:
logb x = y
with b being the base, x being a real number, and y being an exponent. Macos mojave 10 14 6 download.
For example, 23 = 8 ⇒ log2 8 = 3 (the logarithm of 8 to base 2 is equal to 3, because 23 = 8).
Similarly, log2 64 = 6, because 26 = 64.
Similarly, log2 64 = 6, because 26 = 64.
Therefore, it is obvious that logarithm operation is an inverse one to exponentiation.
Meta 1 9 5 X 2 3
21 | 22 | 23 | 24 | 25 | 26 |
2 | 4 | 8 | 16 | 32 | 64 |
log22 = 1 | log24 = 2 | log28 = 3 | log216 = 4 | log232 = 5 | log264 = 6 |
Unfortunately, not all logarithms can be calculated that easily.For example, finding log2 5 is hardly possible by just using our simple calculation abilities.After using logarithm calculator, we can find out that
log2 5 = 2,32192809
There are a few specific types of logarithms.For example, the logarithm to base 2 is known as the binary logarithm,and it is widely used in computer science and programming languages.The logarithm to base 10 is usually referred to as the common logarithm,and it has a huge number of applications in engineering, scientific research, technology, etc.Finally, so called natural logarithm uses the number e (which is approximately equal to 2.71828) as its base,and this kind of logarithm has a great importance in mathematics, physics,and other precise sciences.
The logarithmlogb(x) = y is read as log base b of x is equals to y.
Please note that the base of log number b must be greater than 0 and must not be equal to 1.And the number (x) which we are calculating log base of (b) must be a positive real number.
Please note that the base of log number b must be greater than 0 and must not be equal to 1.And the number (x) which we are calculating log base of (b) must be a positive real number.
Tuneskit audio converter 2 0 4 download free. For example log 2 of 8 is equal to 3.
Common Values for Log Base
Log Base | Log Name | Notation | Log Example |
---|---|---|---|
2 | binary logarithm | lb(x) | log2(16) = lb(16) = 4 => 24 = 16 |
10 | common logarithm | lg(x) | log10(1000) = lg(1000) = 3 => 103 = 1000 |
e | natural logarithm | ln(x) | loge(8) = ln(8) = 2.0794 => e2.0794 = 8 |
Logarithmic Identities
Meta 1 9 5 X 2
List of logarithmic identites, formulas and log examples in logarithm form.
Logarithm of a Quotient
Meta 1 9 5 X 24 Tractor Tires
Change of Base
5+2 X 10 Answer
Natural Logarithm Examples
Meta 1 9 5 X 24 Tractor Tire
- ln(2) = loge(2) = 0.6931
- ln(3) = loge(3) = 1.0986
- ln(4) = loge(4) = 1.3862
- ln(5) = loge(5) = 1.609
- ln(6) = loge(6) = 1.7917
- ln(10) = loge(10) = 2.3025
1+4 5 2+5 12 Puzzle
Logarithm Values Tables
List of log function values tables in common base numbers.
log2(x) | Notation | Value |
---|---|---|
log2(1) | lb(1) | 0 |
log2(2) | lb(2) | 1 |
log2(3) | lb(3) | 1.584963 |
log2(4) | lb(4) | 2 |
log2(5) | lb(5) | 2.321928 |
log2(6) | lb(6) | 2.584963 |
log2(7) | lb(7) | 2.807355 |
log2(8) | lb(8) | 3 |
log2(9) | lb(9) | 3.169925 |
log2(10) | lb(10) | 3.321928 |
log2(11) | lb(11) | 3.459432 |
log2(12) | lb(12) | 3.584963 |
log2(13) | lb(13) | 3.70044 |
log2(14) | lb(14) | 3.807355 |
log2(15) | lb(15) | 3.906891 |
log2(16) | lb(16) | 4 |
log2(17) | lb(17) | 4.087463 |
log2(18) | lb(18) | 4.169925 |
log2(19) | lb(19) | 4.247928 |
log2(20) | lb(20) | 4.321928 |
log2(21) | lb(21) | 4.392317 |
log2(22) | lb(22) | 4.459432 |
log2(23) | lb(23) | 4.523562 |
log2(24) | lb(24) | 4.584963 |
log10(x) | Notation | Value |
---|---|---|
log10(1) | log(1) | 0 |
log10(2) | log(2) | 0.30103 |
log10(3) | log(3) | 0.477121 |
log10(4) | log(4) | 0.60206 |
log10(5) | log(5) | 0.69897 |
log10(6) | log(6) | 0.778151 |
log10(7) | log(7) | 0.845098 |
log10(8) | log(8) | 0.90309 |
log10(9) | log(9) | 0.954243 |
log10(10) | log(10) | 1 |
log10(11) | log(11) | 1.041393 |
log10(12) | log(12) | 1.079181 |
log10(13) | log(13) | 1.113943 |
log10(14) | log(14) | 1.146128 |
log10(15) | log(15) | 1.176091 |
log10(16) | log(16) | 1.20412 |
log10(17) | log(17) | 1.230449 |
log10(18) | log(18) | 1.255273 |
log10(19) | log(19) | 1.278754 |
log10(20) | log(20) | 1.30103 |
log10(21) | log(21) | 1.322219 |
log10(22) | log(22) | 1.342423 |
log10(23) | log(23) | 1.361728 |
log10(24) | log(24) | 1.380211 |
loge(x) | Notation | Value |
---|---|---|
loge(1) | ln(1) | 0 |
loge(2) | ln(2) | 0.693147 |
loge(3) | ln(3) | 1.098612 |
loge(4) | ln(4) | 1.386294 |
loge(5) | ln(5) | 1.609438 |
loge(6) | ln(6) | 1.791759 |
loge(7) | ln(7) | 1.94591 |
loge(8) | ln(8) | 2.079442 |
loge(9) | ln(9) | 2.197225 |
loge(10) | ln(10) | 2.302585 |
loge(11) | ln(11) | 2.397895 |
loge(12) | ln(12) | 2.484907 |
loge(13) | ln(13) | 2.564949 |
loge(14) | ln(14) | 2.639057 |
loge(15) | ln(15) | 2.70805 |
loge(16) | ln(16) | 2.772589 |
loge(17) | ln(17) | 2.833213 |
loge(18) | ln(18) | 2.890372 |
loge(19) | ln(19) | 2.944439 |
loge(20) | ln(20) | 2.995732 |
loge(21) | ln(21) | 3.044522 |
loge(22) | ln(22) | 3.091042 |
loge(23) | ln(23) | 3.135494 |
loge(24) | ln(24) | 3.178054 |