3.Solve the formula for the area of a parallelogram the height, h.
A=b xh
h =
(use the / symbol to show division)

Answers

Answer 1

Answer:

Answer:

The answer would be A/B=H

Step-by-step explanation:

To get rid of the B that is connected to the H, you would do the opposite of what they used. Meaning since the two were multiplied you would divide them. So, you would take your b and divide it on both sides of the equal sign. B and B cancels each other out so you are left with A/B which equals H.

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If
x + 2y = 1
x-2y = 13'
then y =

Answers

On solving the given set of equations, we get the value of y = 3.

What do we mean by simultaneous equations?

A set of equations having two or more variables whose values can satisfy all the equations in the set at the same time, with the number of variables equal to or fewer than the number of equations in the set is called simultaneous equations.

How do we solve the given question?

We are given a set of simultaneous equations in x and y,

x + 2y = 1

x - 2y = 13.

We are asked to find the value of y.

Let the equations

x + 2y = 1... (i)

x 2y = 13 ... (ii).

To solve for y, we subtract (i) from (ii) to get,

$x - 2y = 13\nx+2y=1\n(-)(-)(-)\n------\n-4y = 12$

∴ We get -4y = 12.

Dividing both sides of this equation by -4, we get,

(-4y)/(-4) = 12/(-4)

or, y = -3.

∴ On solving the given set of the equation we get the value of y = 3.

Learn more about simultaneous equations at

brainly.com/question/148035

#SPJ2

Answer:

y= -3

Step-by-step explanation:

adding both the equation we get x= 7

and then put value of x in any one equation u will get y as -3

Identify this conic section. x 2 - 4x + y 2 - 4y + 4 = 12

Answers

I believe a is going to be a circle

Find the geometric mean x of each pair of numbers. 1.5 and 84

Answers

Geometric Mean = √(1.5 × 84)
Geometric Mean = √(126)
Geometric Mean = √(9 × 14)
Geometric Mean = √(9)√(14)
Geometric Mean = 3√(14)

Graph each pair of parametric equations.
x = 3 sin^3t
y = 3 cos^3t

Answers

Answer with explanation:

We are given a parametric equation as:

$x=3 \sin^3 t$

and $y=3 \cos^3 t$

Hence, we can represent our equation as:

$\sin^3 t=(x)/(3)\n\n\n\sin t=((x)/(3))^{(1)/(3)}\n\n\nHence,\n\n\sin^2 t=((x)/(3))^{(2)/(3)}\n\nand\ similarly\n\n\cos^3 t=(y)/(3)\n\n\cos t=((y)/(3))^{(1)/(3)}\n\nHence,\n\n\cos^2 t=((y)/(3))^{(2)/(3)}$

As we know that:

$\cos^2 t+\sin^2 t=1$

Hence, on putting the value in the formula we get the equation in rectangular coordinates as:

$((x)/(3))^{(2)/(3)}+((y)/(3))^{(2)/(3)}=1$

Hence, this is a equation of a ASTROID.

Hello,

This is an astroïde.

(x/3)^(2/3)+(y/3)^(2/3)=1

Pls help its the last question

Answers

Answer:

I believe the answer is -60

Step-by-step explanation:

Write a recursive and explicit rule for each geometric sequence, and then find the next 3 terms.1.) 2, 8, 32

2.) 1004, 512, 256

Answers

Hello,

1)
$a_(0)=2$
$a_(1)=a_(0)*4=8$
$a_(2)=a_(1)*4=a_(0)*4^2=32$
$a_(3)=a_(2)*4=a_(0)*4^3=128$
$a_(4)=a_(3)*4=a_(0)*4^4=512$
$a_(5)=a_(4)*4=a_(0)*4^5=2048$
...
$a_(n+1)=a_(n)*4=a_(0)*4^(n+1)$

2)
$a_(0)=1024$
$a_(1)=a_(0)*0.5=512$
$a_(2)=a_(1)*0.5=a_(0)*0.5^(2)=256$
$a_(3)=a_(2)*0.5=a_(0)*0.5^(3)=128$
$a_(4)=a_(3)*0.5=a_(0)*0.5^(4)=64$
$a_(5)=a_(4)*0.5=a_(0)*0.5^(5)=32$
....
$a_(n+1)=a_(n)*0.5=a_(0)*0.5^(n+1)$

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What does | 3+i | equal