Deriving the value table

Learning a trick to remember the value table

Understanding the history of trigonometry

Solving complex trigonometric equations

Divide numbers by 4

Multiply numbers by 2

Write down numbers from 0 to 4

Take the square root of numbers

By adding 90 degrees to sine values

By subtracting sine values from 1

By multiplying sine values by 2

By using the concept of complementary angles

Cosecant is the inverse of sine

Cosecant is the sum of sine and cosine

Cosecant is the difference between sine and cosine

Cosecant is the square of sine

Root 3

1

0

1/Root 3

Because it results in infinity

Because it is a meaningless expression

Because it equals zero

Because it is a negative number

Cosecant

Tangent

Cosine

Sine

90 degrees

30 degrees

45 degrees

60 degrees

By subtracting 45 from sine 45

By using the inverse of sine 45

By using the square of sine 45

By adding 45 to sine 45

The table is only useful for angles above 90 degrees

The table is not applicable in real-world problems

You need to memorize the entire table

You can derive the entire table from sine values