QUESTION IMAGE
Question
name
date
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unit 6 relationships in triangles
homework 8 centroid, orthocenter, incenter, circumcenter review
this is a 2 - page document!
- if g is the centroid of △ceh, eh = 35, an = 18
and he = 14, find each measure.
a) dg =
b) ge =
c) de =
d) ch =
e) ce =
- if z is the centroid of △lmn, wz = 6, zn = 14
and zt = 15, find each measure.
a) zm =
b) wm =
c) xz =
d) xn =
e) lz =
- if d is the centroid of △pqr, pa = 12,
rd = 8 and dq = 14, find each measure.
a) ar =
b) pr =
c) dr =
d) br =
e) ad =
f) aq =
- if m is the centroid of △ghi, hl = 45, jf = 63
and kg = 60, find each measure.
a) ml =
b) hm =
c) jm =
d) mi =
e) gm =
f) mk =
- if m is the centroid of △abc, am = 44,
ce = 54 and dm = 23, find each measure.
a) fm =
b) af =
c) cm =
d) me =
e) mb =
f) db =
- if z is the centroid of △wxy, wr = 87,
sy = 39, and yt = 48, find each measure.
a) ws =
b) wy =
c) wz =
d) zr =
e) zt =
f) yz =
© gina wilson (all things algebra), llc 2014 - 20
1. (Centroid of $\triangle DFE$)
Step1: Recall centroid ratio rule
Centroid divides medians into $2:1$ (long:short)
Step2: Calculate $DG$ (median $FG$)
$FG=32$, so $DG=\frac{2}{3} \times 32 = \frac{64}{3} \approx 21.33$
Step3: Calculate $GE$ (part of $FG$)
$GE=\frac{1}{3} \times 32 = \frac{32}{3} \approx 10.67$
Step4: Calculate $DF$ (given median $DH=18$)
$DF$ is a side, median $DH=18$, so $DF$ is not split here; wait, correction: $DH$ is median, $CH$ is segment. $DH=18$, so $CH=\frac{1}{3} \times 18=6$, $CD=\frac{2}{3} \times18=12$. $DF$: no, $FE=14$, median $EI=14$, so $DE$ is split: $CE=\frac{2}{3} \times14=\frac{28}{3}\approx9.33$, $CI=\frac{1}{3} \times14=\frac{14}{3}\approx4.67$. Wait, original: $FG=32$, $DH=18$, $FE=14$.
- a) $DG = \frac{2}{3} \times FG = \frac{2}{3} \times 32 = \frac{64}{3}$
- b) $GE = \frac{1}{3} \times FG = \frac{32}{3}$
- c) $DF$: not a median segment, wait no, $DH$ is median to $DF$, so $DH$ splits $DF$? No, centroid is intersection of medians: $H$ is midpoint of $DF$, so $DF=2 \times DH$? No, $DH$ is median, so $H$ is midpoint of $DF$, so $DF=2 \times FH$, but $DH=18$ is the median length. Wait, centroid $G$ divides $DH$ into $DG:GH=2:1$, so $GH=6$, $DG=12$. Oh! I misread: $H$ is on $DF$, so $DH$ is median, length 18, so centroid $G$ is on $DH$, so $DG=\frac{2}{3} \times18=12$, $GH=6$. $FE=14$ is median $EI$, so $CE=\frac{2}{3} \times14=\frac{28}{3}$, $CI=\frac{14}{3}$. $FG=32$ is median, $GE=\frac{1}{3} \times32=\frac{32}{3}$, $DG=\frac{64}{3}$.
Correct steps:
Step1: Centroid splits medians 2:1
Centroid $G$: $\frac{\text{long segment}}{\text{median}}=\frac{2}{3}$, $\frac{\text{short segment}}{\text{median}}=\frac{1}{3}$
Step2: Solve a) $DG$ (from $FG=32$)
$DG = \frac{2}{3} \times 32 = \frac{64}{3}$
Step3: Solve b) $GE$ (from $FG=32$)
$GE = \frac{1}{3} \times 32 = \frac{32}{3}$
Step4: Solve c) $DF$: $H$ is midpoint of $DF$, $DH$ is median length 18, so $DF$ is not split by centroid, wait no, $DH$ is median, so $H$ is midpoint, so $DF=2 \times FH$, but we don't have $FH$. Wait, no, the question says "find each measure": $DF$ is a side, but $DH$ is median, so we can't find $DF$ unless $DH$ is median to $DF$, so $H$ is midpoint, so $DF=2 \times FH$, but we don't know $FH$. Wait, original problem: $G$ is centroid, $FG=32$, $DH=18$, $FE=14$. So $DH$ is median, so $G$ is on $DH$, so $DG=\frac{2}{3} \times18=12$, $GH=6$. $FE$ is median $EI$, so $G$ is on $EI$, so $EG=\frac{2}{3} \times14=\frac{28}{3}$, $GI=\frac{14}{3}$. $FG$ is median, so $FG=32$,[LLM SSE On Failure]
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Step1: Recall centroid ratio rule
Centroid divides medians into $2:1$ (long:short)
Step2: Calculate $DG$ (median $FG$)
$FG=32$, so $DG=\frac{2}{3} \times 32 = \frac{64}{3} \approx 21.33$
Step3: Calculate $GE$ (part of $FG$)
$GE=\frac{1}{3} \times 32 = \frac{32}{3} \approx 10.67$
Step4: Calculate $DF$ (given median $DH=18$)
$DF$ is a side, median $DH=18$, so $DF$ is not split here; wait, correction: $DH$ is median, $CH$ is segment. $DH=18$, so $CH=\frac{1}{3} \times 18=6$, $CD=\frac{2}{3} \times18=12$. $DF$: no, $FE=14$, median $EI=14$, so $DE$ is split: $CE=\frac{2}{3} \times14=\frac{28}{3}\approx9.33$, $CI=\frac{1}{3} \times14=\frac{14}{3}\approx4.67$. Wait, original: $FG=32$, $DH=18$, $FE=14$.
- a) $DG = \frac{2}{3} \times FG = \frac{2}{3} \times 32 = \frac{64}{3}$
- b) $GE = \frac{1}{3} \times FG = \frac{32}{3}$
- c) $DF$: not a median segment, wait no, $DH$ is median to $DF$, so $DH$ splits $DF$? No, centroid is intersection of medians: $H$ is midpoint of $DF$, so $DF=2 \times DH$? No, $DH$ is median, so $H$ is midpoint of $DF$, so $DF=2 \times FH$, but $DH=18$ is the median length. Wait, centroid $G$ divides $DH$ into $DG:GH=2:1$, so $GH=6$, $DG=12$. Oh! I misread: $H$ is on $DF$, so $DH$ is median, length 18, so centroid $G$ is on $DH$, so $DG=\frac{2}{3} \times18=12$, $GH=6$. $FE=14$ is median $EI$, so $CE=\frac{2}{3} \times14=\frac{28}{3}$, $CI=\frac{14}{3}$. $FG=32$ is median, $GE=\frac{1}{3} \times32=\frac{32}{3}$, $DG=\frac{64}{3}$.
Correct steps:
Step1: Centroid splits medians 2:1
Centroid $G$: $\frac{\text{long segment}}{\text{median}}=\frac{2}{3}$, $\frac{\text{short segment}}{\text{median}}=\frac{1}{3}$
Step2: Solve a) $DG$ (from $FG=32$)
$DG = \frac{2}{3} \times 32 = \frac{64}{3}$
Step3: Solve b) $GE$ (from $FG=32$)
$GE = \frac{1}{3} \times 32 = \frac{32}{3}$