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6x+18=h(3x+9)

Explain the meanings of the terms linearly dependent and coplanar. Make sure you demonstrate that you understand the difference between the terms, and the situation in which linear dependency implies coplanarity.

Suppose that a bike rents for $4 plus $ 1.50 per hours. write an equation in slope - intercept form that models this situation

If a and b are non-collinear vectors and A = (x+y)a+(2x+y+1)b

A=(x+y)a+(2x+y+1)b

a) x=2,y=4

b) x=2,y=1

c)x=4,y2

d)x=1,y=1.

What is the answer from the option above pls

A=(x+y)a+(2x+y+1)b

a) x=2,y=4

b) x=2,y=1

c)x=4,y2

d)x=1,y=1.

What is the answer from the option above pls

Can the magnitude of the resultant of the two vectors be greater than the sum of magnitude of individual vector?

Three of the best-selling albums of 2013 were Justin Timberlake's The 20120 Experience, Eminem's The Marshall Mathers LP2, and Imagine Dragons' Night Visions. Eminem's album sold 0.33 million more copies than Imagine Dragons'. The number of Justin Timberlake albums sold was 0.37 million less than twice the number of Imagine Dragons' sales. The three recording artists sold a total of 5.56 million albums. How many albums did each artist sell?

a) Check whether the following system of equations has a solution.

x+y+3z+w = 5

−x+y+z−5w = 7

x+2y+5z−w = 5 (6)

b) Let T : P2 → P1 be defined by

T(a+bx+cx2

) = b+c+ (a−c)x.

Check that T is a linear transformation. Find the matrix of the transformation with

respect to the ordered bases B1 = {x

2

, x

2 +x, x

2 +x+1} and B2 = {1, x}. Find the

kernel of T.

x+y+3z+w = 5

−x+y+z−5w = 7

x+2y+5z−w = 5 (6)

b) Let T : P2 → P1 be defined by

T(a+bx+cx2

) = b+c+ (a−c)x.

Check that T is a linear transformation. Find the matrix of the transformation with

respect to the ordered bases B1 = {x

2

, x

2 +x, x

2 +x+1} and B2 = {1, x}. Find the

kernel of T.

The admission fee at an amusement park is $ 1.50 for children and $ 4.00 for adults. On a certain day, 299 people entered the park, and the admission fees collected totaled $936 . How many children and how many adults were admitted?

) Let V = R

2

. Define addition + on V by (x1, y1) + (x2, y2) = (x1 +x2, y1 +y2) and

scalar multiplication · by r·(a,b) = (ra,0). Check whether V satisfies all the

conditions for it to be a vector space over R with respect to these operations.

2

. Define addition + on V by (x1, y1) + (x2, y2) = (x1 +x2, y1 +y2) and

scalar multiplication · by r·(a,b) = (ra,0). Check whether V satisfies all the

conditions for it to be a vector space over R with respect to these operations.

For any four vectors a^ vector, b ^ vector, C ^ vector and d ^ vector determine : (a^ vector × b^ vector)(c ^ vector × d ^ vector) + (b^ vector × c^ vector) (a^vector × d^vector) + (c^vector × a^ vector) ( b^vector × d^ vector).