TīmeklisThe ratio in which the line segment joining the points (1, – 7) and (6, 4) is divided by the x-axis is ___. A 3:1 B 2:3 C 7:2 D 7:4 Solution The correct option is C 7:4 Let us consider a point C (x, 0), that divides AB in the ratio k:1. By section formula, the coordinates of C are given by: ( 6k+1 k+1, 4k−7 k+1) TīmeklisSimplify Calculator Step 1: Enter the expression you want to simplify into the editor. The simplification calculator allows you to take a simple or complex expression and …

How do you find the ratio of x to y given 5x = 6y? Socratic

TīmeklisSupply Last Active Supply 7y-10y. get. Supply Last Active >10y. get. Supply Last Active 1+ Years Ago. get. Supply Last Active 2+ Years Ago. get. Supply Last Active 3+ … TīmeklisSince the required line is parallel to the given line, so the direction ratios of the required line are proportional to 7, -5 , 1 . The vector equation of the required line passing through the point (1, 2,-1,) and having direction ratios proportional to 7,-5,1 is r → = ( i ^ + 2 j ^ − k ^) + λ ( 7 i ^ − 5 j ^ + k ^) dfhe 83/gi

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TīmeklisLet the ratio be k:1 and P be the point where lines intersect. Substituting (x 1,y 1)=(2,−2) and (x 2,y 2)=(3,7) in the section formula, we get P=( k+1k(3)+1(2), k+1k(7)+1(−2))=( k+13k+2, k+17k−2) Since 2x+y−4=0 divides the line at P, So the point P lie on this line, therefore we have 2( k+13k+2)+ k+17k−2−4=0 6k+4+7k−2−4k−4=0 9k=2 k= 92 Tīmeklis2010. gada 1. maijs · Row 10: 1 10 45 120 210 ... <---> 1x^10 + 10x^9y^1 + 45x^8y^2 + 120x^7y^3. If you do it by combinations, you want 10nCr7 = 120. (the 10 comes from … Tīmeklis2016. gada 23. janv. · SagarStudy. Jan 23, 2016. 5x = 6y. Divide both sides by y. ⇒ 5x y = 6y y. ⇒ 5x y = 6. Divide both sides by 5. ⇒ 5x 5y = 6 5. ⇒ x y = 6 5. df header python