All categories

3 years ago

Answer the question.

Mathematics

2 answers:

Maurinko [17]3 years ago

7 0

Answer:

z=18

Step-by-step explanation:

because you have to multiply If x is 3 the multiply 3 times 2 and it is y is 6 and then 6 times 3 is z is 18 and there is your answer.

Gelneren [198K]3 years ago

3 0

Answer: 3y

Step-by-step explanation: hope this helps :)

You might be interested in

Is this answer correct a=70 b=45 c=45 <br>if its incorrect, what is the actual correct answer?

mafiozo [28]

I do believe your right!

4 0

4 years ago

Simplify by using the distributive property and then combine like terms:

Anon25 [30]

Answer:

12x - 36

Step-by-step explanation:

4 (3x – 9)

Distribute

4 *3x - 4*9

12x - 36

6 0

3 years ago

Read 2 more answers

What 26 divided by 3

Dimas [21]

Answer:

8.6666

Step-by-step explanation:

u divide 26 by 3

5 0

4 years ago

Read 2 more answers

Can you please help me with this question

laila [671]

Answer:

$3\frac{4}{7} *(-6\frac{4}{7}), -7\frac{1}{7} *(-2\frac{1}{4}), 5\frac{1}{7} *5\frac{1}{7}$

Step-by-step explanation:

3 0

3 years ago

Read 2 more answers

Let ????C be the positively oriented square with vertices (0,0)(0,0), (2,0)(2,0), (2,2)(2,2), (0,2)(0,2). Use Green's Theorem to

bonufazy [111]

Answer:

-48

Step-by-step explanation:

Lets call L(x,y) = 10y²x, M(x,y) = 4x²y. Green's Theorem stays that the line integral over C can be calculed by computing the double integral over the inner square of Mx - Ly. In other words

$\int\limits_C {L(x,y)} \, dx + M(x,y) \, dy = \int\limits_0^2\int\limits_0^2 (M_x - L_y ) \, dx \, dy$

Where Mx and Ly are the partial derivates of M and L with respect to the x variable and the y variable respectively. In other words, Mx is obtained from M by derivating over the variable x treating y as constant, and Ly is obtaining derivating L over y by treateing x as constant. Hence,

M(x,y) = 4x²y
Mx(x,y) = 8xy
L(x,y) = 10y²x
Ly(x,y) = 20xy
Mx - Ly = -12xy

Therefore, the line integral can be computed as follows

$\int\limits_C {10y^2x} \, dx + {4x^2y} \,dy = \int\limits_0^2\int\limits_0^2 -12xy \, dx \, dy$

Using the linearity of the integral and Barrow's Theorem we have

$\int\limits_0^2\int\limits_0^2 -12xy \, dx \, dy = -12 \int\limits_0^2\int\limits_0^2 xy \, dx \, dy = -12 \int\limits_0^2\frac{x^2y}{2} |_{x = 0}^{x=2} \, dy = -12 \int\limits_0^22y \, dy \\= -24 ( \frac{y^2}{2} |_0^2) = -24*2 = -48$

As a result, the value of the double integral is -48-

3 0

4 years ago

Answer the question.​

Answer the question.