Determine the intersection of the lines: r1=(2,-1,-1)+t(1,2,-1) and r2=(-1,-1,1)+u(-2,-1,1)

Find the intersection point (if any) of the lines r1(t)=(−16,−30,31)+t(−2,−6,5) and r2(s)=(−84,−34,21)+s(8,4,−2). Please show full working...

Find the intersection point (if any) of the lines r1(t)=(−16,−30,31)+t(−2,−6,5) and r2(s)=(−84,−34,21)+s(8,4,−2). Please show full working and all steps to help me learn.

At what point do the curves r1 =〈 t , 1 − t , 3 +...

At what point do the curves r1 =〈 t , 1 − t , 3 + t2 〉 and r2 = 〈 3 − s , s − 2 , s2 〉 intersect? Find the angle of intersection. Determine whether the lines L1 : r1 = 〈 5 − 12t , 3 + 9t ,1 − 3t 〉 and L2 : r2 = 〈 3 + 8s , −6s , 7 + 2s 〉are parallel, skew, or intersecting. Explain. If...

Determine the interval(s) where r(t)=< t-1/((t^2) -1), 2e^3t , In(t+5) > is continuous. And Both r1(t)...

Determine the interval(s) where r(t)=< t-1/((t^2) -1), 2e^3t , In(t+5) > is continuous. And Both r1(t) = < t2, t4 > and  r2(t) = < t4, t8 > map out the same half parabolic graph. Notice that both r1(1) = < 1, 1 > and  r2(1) = < 1, 1 >. However, r'1(1) = < 2, 4 > and  r'2(1) = < 4, 8 >. Explain why the difference is logical and quantify the difference at t=1. Determine the interval(s) where r(t)=<t −...

1.1. Let R be the counterclockwise rotation by 90 degrees. Vectors r1=[3,3] and r2=[−2,3] are not...

1.1. Let R be the counterclockwise rotation by 90 degrees. Vectors r1=[3,3] and r2=[−2,3] are not perpendicular. The inverse U of the matrix M=[r1,r2] has columns perpendicular to r2 and r1, so it must be of the form U=[x⋅R(r2),y⋅R(r1)]^T for some scalars x and y. Find y^−1. 1.2. Vectors r1=[1,1] and r2=[−5,5] are perpendicular. The inverse U of the matrix M=[r1,r2] has columns perpendicular to r2 and r1, so it must be of the form U=[x⋅r1,y⋅r2]^T for some scalars x...

1. Let B = {(−1,2),(1,1)} = {w1,w2} be a basis for R2, and v = (3,...

1. Let B = {(−1,2),(1,1)} = {w1,w2} be a basis for R2, and v = (3, 2). Find (v)B. 2. Find the closest point in the plane 3x−y+2z = 0 to the point p(−1, 2, −1). What is the distance from p to this plane? Thank you.

Two spacecraft are following paths in space given by r1=〈sin(t),t,t^2〉r1=〈sin⁡(t),t,t^2〉 and r2=〈cos(t),1−t,t^3〉.r2=〈cos⁡(t),1−t,t^3〉. If the temperature for...

Two spacecraft are following paths in space given by r1=〈sin(t),t,t^2〉r1=〈sin⁡(t),t,t^2〉 and r2=〈cos(t),1−t,t^3〉.r2=〈cos⁡(t),1−t,t^3〉. If the temperature for the points is given by T(x,y,z)=x^2y(5−z),T(x,y,z)=x^2y(5−z), use the Chain Rule to determine the rate of change of the difference D in the temperatures the two spacecraft experience at time t=2. (Use decimal notation. Give your answer to two decimal places.)

Determine the equivalent resistance of resistors R1, R2, and R3 in (Figure 1) for R1 =...

Determine the equivalent resistance of resistors R1, R2, and R3 in (Figure 1) for R1 = 30 Ω , R2 = 30.0 Ω, and R3 = 15 Ω. Determine the current through R1 if ε = 110 V . Determine the current through R2. (units A) Determine the current through R3. (units A)

what is the length of the curve c[-1,1] in R2 with c(t) = (√1+t,t) as an...

what is the length of the curve c[-1,1] in R2 with c(t) = (√1+t,t) as an integral

Determine whether the relations R1 and R2 are equivalence relations to the specified quantity and, if...

Determine whether the relations R1 and R2 are equivalence relations to the specified quantity and, if necessary, determine the corresponding equivalence classes. ∀x, y ∈Z: x ~R1 y ⇐⇒ x + y is divisible by 2, ∀ g, h ∈ {t: t is a straight line in R2}: g ~R2 h ⇐⇒ g and h have common Points.

Determine whether the relations R1 and R2 are equivalence relations to the specified quantity and, if...

Determine whether the relations R1 and R2 are equivalence relations to the specified quantity and, if necessary, determine the corresponding equivalence classes. ∀x, y ∈Z: x ~R1 y ⇐⇒ x + y is divisible by 2, ∀ g, h ∈ {t: t is a straight line in R2}: g ~R2 h ⇐⇒ g and h have common Points.