Let A = (−5,3,5), B = (−10,0,2), C = (−5,0,−3), and D = (0,3,0). a) Find...

let A (1 , 2, -3), B (2, 1, 4) and C (0, 0, 2) be...

let A (1 , 2, -3), B (2, 1, 4) and C (0, 0, 2) be three points in R^3 a) give the parametric equation of the line orthogonal to the plane containing A, B and C and passing through point A. b) find the area of the triangle ABC linear-algebra question show clear steps and detailed solutions solve in 30 minutes for thumbs up rating :)

1. Answer the following. a. Find the area of a triangle that has sides of lengths...

1. Answer the following. a. Find the area of a triangle that has sides of lengths 9, 10 and 13 inches. b. True or False? If a, b, and θ are two sides and an included angle of a parallelogram, the area of the parallelogram is absin⁡θ. c. Find the smallest angle (in radians) of a triangle with sides of length 3.6,5.5,3.6,5.5, and 4.54.5 cm. d. Given △ABC with side a=7 cm, side c=7 cm, and angle B=0.5 radians, find...

Let O be the center of circumscribed circle of ABC triangle. Let a, b, c be...

Let O be the center of circumscribed circle of ABC triangle. Let a, b, c be the vectors pointing from O to the vertexes. Let M be the endpoint of a + b + c measured from O. Prove that M is the orthocenter of ABC triangle.

In triangle ABC , let the bisectors of angle b meet AC at D and let...

In triangle ABC , let the bisectors of angle b meet AC at D and let the bisect of angle C meet at AB at E. Show that if BD is congruent to CE then angle B is congruent to angle C.

-Let a and b be the vectors a = (1,−2,2) and b = (−3,4,0). (a) Compute...

-Let a and b be the vectors a = (1,−2,2) and b = (−3,4,0). (a) Compute a · b. (b) Find the angle between a and b. Leave it as an exact answer. (c) Compute a × b. (d) Find the area of the parallelogram spanned by a and b. (e) True or False: The product a · (b × a) is a vector.

1) Let a = 〈4,−5,−2〉 and b = 〈2,−4,−5〉 Find the projection of b onto a....

1) Let a = 〈4,−5,−2〉 and b = 〈2,−4,−5〉 Find the projection of b onto a. proj a b= 2) Find the area of a triangle PQR, where P=(−2,−4,0), Q=(1,2,−1), and R=(−3,−6,5) 3) Complete the parametric equations of the line through the points (7,6,-1) and (-4,4,8) x(t)=7−11 y(t)= z(t)=

G1 = (A’+C’+D) (B’+A) (A+C’+D’) G2 = (ABC’) + (A’BC) + (ABD) G3 = (A+C) (A+D)...

G1 = (A’+C’+D) (B’+A) (A+C’+D’) G2 = (ABC’) + (A’BC) + (ABD) G3 = (A+C) (A+D) (A’+B+0) G4 = (G1) (A+C) G5 = (G1) (G2) G6 = (G1)+(G2) Determine the simplest product-of-sums (POS) expressions for G1 and G2. Determine the simplest sum-of-products (SOP) expressions for G3 and G4. Find the maxterm list forms of G1 and G2 using the product-of-sums expressions. Find the minterm list forms of G3 and G4 using the sum-of-products expression. Find the minterm list forms of...

The vertices of a quadrilateral are listed below. A = (2, −3, 1) B = (6,...

The vertices of a quadrilateral are listed below. A = (2, −3, 1) B = (6, 5, −1) C = (7, 2, 2) D = (3, −6, 4) (a) Show that the quadrilateral is a parallelogram. (b) Find the area of the parallelogram.

Question 1. Let a = i + 2j − k and b = i − 3j...

Question 1. Let a = i + 2j − k and b = i − 3j + k (a) Find vectors v and w such that b=v+w where v is parallel to a, but w is perpendicular to a. (b) Recall that the area of a triangle is half the length of its base times its height. Find the area of the triangle with corners at the points (2,0,0), (3,2,−1) and (3,−3,1), and explain what this has to do with...

Let J be a point in the interior of triangle ABC. Let D, E, F be...

Let J be a point in the interior of triangle ABC. Let D, E, F be the feet of the perpendiculars from J to BC, CA, and AB, respectively. If each of the three quadrilaterals AEJF, BFJD, CDJE has an inscribed circle tangent to all four sides, then J is the incenter of ∆ABC. It is sufficient to show that J lies on one of the angle bisectors.