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3 years ago

How to find the missing side of congruent figures

Mathematics

1 answer:

allsm [11]3 years ago

4 0

Its hard to explain this without an example. Add an example and I can show my work?

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Find the value of the trigonometric ratio.<br><br> A.3/5<br> B.3/4<br> C.4/3<br> D.4/5

Montano1993 [528]

We know that :

$tan(X) = \dfrac{ZY}{XY}$

$tan(X) = \dfrac{15}{20}$

$tan(X) = \dfrac{3}{4}$

therefore , the correct option is B. 3/4

7 0

3 years ago

Read 2 more answers

How can i use scalling to help predict the product of a number anda fraction

andreev551 [17]

You could .......... lol wth am I talking about wanna go out 4 lunch girl

6 0

4 years ago

When Mr. Peters drives from Boston to Worcester it takes him 30 minutes travelling at a speed of 60 miles per hour. Mrs. Peters

pochemuha

Since the problem is requesting the answer in minutes, we are going to convert the speed of Mr. Peter to miles per minutes; to do that, we are going to multiply his speed by the multiplier $\frac{60min}{1h}$ :
$60 \frac{miles}{h} * \frac{1h}{60min} =1 \frac{mile}{min}$

Now, to find the distance from Boston to Worcester, we are going to use the distance formula: $d=vt$
where
$d$ is the distance
$v$ is the speed
$t$ is the time

We know that the speed of Mr. Peter is $1 \frac{mile}{min}$ and his time is 30 minutes. Lets replace those values in our formula:
$d=1 \frac{mile}{min} *30min$
$d=30miles$

Now, lets concentrate on Mr. Peter clone, Mr. P:
Lets convert the speed of Mr. P to miles per minute:
$\frac{90miles}{h} * \frac{1h}{60min} =1.5 \frac{miles}{min}$
We also know that they will cover the same distance, 30 miles. Lets replace the values in our formula one more time to find t:
$d=vt$
$30miles= 1.5\frac{miles}{min} *t$
$t= \frac{30miles}{1.5\frac{miles}{min}}$
$t=20min$
But since Mr. P <span>leaves 5 minutes after Mr. Peters, we need to add those 5 minutes to M. P's time:
</span> $t=20min+5min$
$t=25min$

We can conclude that Mr. P will arrive first, 5 minutes before Mr. Peter.

4 0

3 years ago

Read 2 more answers

Solve the equation f (x + 2) = f (x-2) +4, where f (x) = 3 + 2x + x ^ 2

Vlad [161]

<h2>Answer:</h2>

The value of x is -1/2

<h2>Step-by-step explanation:</h2><h3>Question :</h3>

Solve the equation of f(x + 2) = f(x - 2) + 4, where f(x) = 3 + 2x + x^2

<h3>Solution :</h3>

First, we need to split the equation and find the answer to each function

f(x + 2) = 3 + 2(x + 2) + (x + 2)^2

f(x + 2) = 3 + 2x + 4 + x^2 + 4x + 4

f(x - 2) = 3 + 2(x - 2) + (x - 2)^2

f(x - 2) = 3 + 2x - 4 + x^2 - 4x + 4

Second, we need to find the value of x

f(x + 2) = f(x - 2) + 4

=> x^2 + 6x + 11 = x^2 - 2x + 3 + 4

=> x^2 - x^2 + 6x + 11 = - 2x + 3 + 4

=> 6x + 11 = -2x + 7

=> 6x = -2x - 4

=> 6x + 2x = -4

=> 8x = -4

=> x = -1/2

<h3>Conclusion :</h3>

The value of x is -1/2

3 0

3 years ago

Prove it disprove: if 2n + 4 is even then n is even.

svetoff [14.1K]

The first claim,

"If 2<em>n</em> + 4 is even, then <em>n</em> is even"

is false; as a counterexample, consider <em>n</em> = 1, which is odd, yet 2•1 + 4 = 6 is even.

The second claim,

"If <em>n</em> is even, then (<em>n</em> + 3)² is odd"

is true. This is because

(<em>n</em> + 3)² = <em>n</em> ² + 6<em>n</em> + 9

<em>n</em> ² + 6<em>n</em> is even because <em>n</em> is even. 9 is odd. The sum of an even and odd integer is odd.

8 0

3 years ago