Solve for t 4 =1/2.5

Mathematics

2 answers:

GenaCL600 [577]3 years ago

4 0

Answer:

the answer is 0.79 rounded to the nearest hundreth

Step-by-step explanation:

evablogger [386]3 years ago

3 0

The answer is 0.79 rounded to the nearest hundredth

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Solve for X

satela [25.4K]

Answer:

3) 16

Step-by-step explanation:

these are alternate-interior angles which are congruent

10x-23 = 137

10x = 160

x = 16

4 0

3 years ago

Read 2 more answers

(problem 83)

AVprozaik [17]

To find the derivative of this function, there is a property that we should know called the Constant Multiple Rule, which says:

$\dfrac{d}{dx}[cf(x)] = cf'(x)$ (where $c$ is a constant)

Remember that the derivative of $\csc(x)$ is $-\csc(x)\cot(x)$ . However, you may notice that we are finding the derivative of $\dfrac{1}{2}\csc(2x)$ , not $\dfrac{1}{2} \csc(x)$ . So, we are going to have to use the chain rule. To complete the chain rule for the derivative of a trigonometric function (in layman's terms) is basically the following: First, complete the derivative of the trig function as you would if what was inside the trig function is $x$ . Then, take the derivative of what's inside of the trig function and multiply it by what you found in the first step.

Let's apply that to our problem. Right now, I am not going to worry about the $\dfrac{1}{2}$ at the front of the equation, since we can just multiply it back in at the end of our problem. So, let's examine $\csc(2x)$ . We see that what's inside the trig function is $2x$ , which has a derivative of 2. Thus, let's first find the derivative of $\csc(2x)$ as if $2x$ was just $x$ and then multiply it by 2.

The derivative of $\csc(2x)$ would first be $-\cot(2x)\csc(2x)$ . Multiplying it by 2, we get our derivative of $-2\cot(2x)\csc(2x)$ . However, don't forget to multiply it by the $\dfrac{1}{2}$ that we removed near the beginning. This gives us our final derivative of $-\cot(2x)\csc(2x)$ .

Remember that we now have to find the derivative at the given point. To do this, simply "plug in" the point into the derivative using the x-coordinate. This is shown below:

$-\cot[2(\dfrac{\pi}{4})]\csc[2(\dfrac{\pi}{4})]$