This week’s Carnival of Homeschooling is hosted by the delightful Juggling Paynes of Home Spun Juggling. The very appropriate theme they have chosen is The Juggling Workshop. Drop by the Carnival and pick up some great homeschooling tips along with their tips on juggling. (I’ve always wanted to learn how to juggle — I wonder if they can help me?)
Updated Learning Style Pages
Some of our information on Learning Styles has just been updated (giving you a sneak peak at the new book I am working on).
See the new pages here:
Auditory Learners
Kinesthetic Learners
Tactile Learners
Visual Learners
Back to Homeschool with New Ideas
Back to School signs are everywhere. The stores are stocked with new boxes of crayons, new notebooks, and new backpacks. If you are not quite ready for the next semester to begin, it may be because you feel insufficiently prepared for it yourself. Where are the new school supplies for you — maybe some new coping skills, a new supply of encouragement, and a new box of ideas?
If you are a First-Time Homeschoolerand are beginning with a preschooler or Kindergartner, these articles contain the coping skills you need for this new task ahead of you.
- Preschool Is Not Brain Surgery
- Preschoolers’ Educational School-Time Activities
- Social Skills — What Should I Teach My Preschooler?
- Time for Kindergarten Round-Up?
- Start with Reading, Handwriting, & Arithmetic, and Save the Rest for Later
For those of you who are Leaving Public Schoolto begin homeschooling, the following articles will give you a generous dose of encouragement.
- So You Think You’re Not Smart Enough to Homeschool?
- Meatball Education: Filling in the Potholes of Public School
- Surviving the First Year of Homeschooling After Leaving Public School
- Top 15 Mottoes to Get You Through Your First Homeschooling Year
Perhaps you have been teaching your own children for a while now, but feel that you are Stuck in a Homeschool Rut. Here are some fresh ideas to break the boredom and put a little life into your tedious routine.
- The Activity Jar
- 10 Fun Math Exercises from a BINGO Game
- Sugar Cube Math
- The Value of Supplemental Activities
- The Importance of Play in Education
Maybe you have just “hit the wall.” You’ve come to the end of yourself, and you don’t know where to turn next. You love the idea of homeschooling, but you just can’t find one more lesson inside yourself.
- A Day Without Lessons
- Too Much, Too Fast = Burnout
- 21 Things That Can Slow Homeschooling Progress
- Becoming a Successful and Proud Quitter
- Looking Back on the Bad Days
- Redeeming a Disaster Day
No matter what your homeschooling status, be assured that you are not alone. Guilt-Free Homeschooling is here to help you with a comforting hug, a large dose of encouragement, a bonus scoop of confidence, and answers to your questions. Let’s have a great year together!
100 Best Blogs for Christian Moms
The folks at the Online Christian Colleges blog have named Guilt-Free Homeschooling one of 100 Best Blogs for Christian Moms. Listed under the category, Best Blogs for Christian Moms who Homeschool, GFHS ranks #71. This list is very intriguing! I found a few blogs I was well acquainted with, along with several new-to-me blogs that I am anxious to check out. Some listings are denomination-specific, and others are more general categories, such as the links for Christian radio stations that offer family-focused programming (both online and local broadcasts). THANK YOU to the Online Christian Colleges blog for including GFHS. We are honored!
Sugar Cube Math
Are you looking for some fun activities to keep your students’ math skills sharp over the summer break? Do your students need help to achieve mastery of math concepts? Sugar cubes can provide just what you need! One of these activities each week may be enough to boost their math thinking skills, but your students just might want to keep playing and experimenting on their own!
A friend once asked me how I used sugar cubes in math. She had visualized the children just eating the sugar and becoming too hyper for any actual learning! Math manipulatives are nothing more than little things used to illustrate a math lesson, and sugar cubes are fairly inexpensive things that just happen to come in perfect little cube shapes, making them ideal for stacking. However, sugar cubes must be handled with some special care to get them past more than one lesson: do not expose them to moisture (not even wet fingers) and keep them on a jelly-roll pan (large cookie sheet with sides) to collect the crumbs of sugar that will inevitably fall off. Handle the cubes gently to prevent crushing them, but do not be too alarmed when a few of the cubes crumble no matter how gently you touch them. (Life is like that: some of us just can’t take as much pressure as others can.) When lesson time is over, your students can carefully place the sugar cubes back into their box to use them again another day. You will probably want to reserve these sugar cubes for math lessons only — they can become a little too soiled with repeated handling for plunking into your morning coffee! The following suggestions will work with any cube-shaped objects (Cuisenaire Rod 1-units, ABC blocks, dice, etc.), as long as all of the cubes are the same size. A box or two of sugar cubes provides a large number of identical cubes for a small investment, and their plain white sides allow the student to focus on the cubes as units, rather than on any decorative details.
Stack them up, pile them up, square up the piles and see how much fun you can have building walls and tiny forts with sugar cubes. Make checkerboard designs or pyramids. Lessons can be much more than boring drill, and you can learn from play! Below are some more structured lessons to try after a free play session. Some parents may need to do these experiments with their children; other parents may need to get out of the way and just let their child experiment to his heart’s content!
Addition is very simply illustrated through counting the total number of cubes that results from combining this group of cubes with that group of cubes. Take this operation to its next logical level and un-do the addition of cubes for a simplified lesson in subtraction. A student who can see that subtraction is nothing more than backwards addition will not be confused into thinking that subtraction is a new and confusing mathematical concept. Illustrate how addition and subtraction are linked together by discussing both concepts with one set of math facts: 2 cubes in this group plus 3 cubes in that group equals 5 cubes all together: 2 + 3 = 5. Therefore, taking 3 cubes away from 5 cubes leaves us with 2 cubes again: 5 – 3 = 2. Switch the numbers around to show that 3 + 2 also equals 5, and 5 – 2 = 3. Experimenting with just those 5 cubes, the student will quickly see that 1 + 4 = 2 + 3, and so on. Repeat these experiments with other groupings of cubes, always focusing on undoing the addition to prove that the subtraction facts are just another way to state the matching addition facts.
An important part of math is learning about prime numbers. Start with just 1 cube and by adding 1 more cube at a time, we will experiment with making different arrangements of the cubes. Any number of cubes that can make only 1 row is called a prime number — it has multiplication factors of only itself and 1. (One by itself does not count as a prime, because it has no factors at all — it’s just one.)
If you have arranged cubes into two equal rows, that means you have at least 4 cubes. Those can be arranged into 1 row of 4 cubes (or 4 rows of 1 cube each), or 2 rows of 2 cubes each. These are also the multiplication factors of 4: 1 x 4, 4 x 1, and 2 x 2.
Add 2 more cubes, 1 to each row, for a total of 6 cubes. Those can also be arranged into 1 row of 6 cubes (or 6 rows of 1 cube each) or 2 rows of 3 cubes each. Now rearrange the cubes into 3 rows of 2 cubes each to prove that 2 x 3 makes the same size and shape of rectangle as 3 x 2, but just turned the other direction.
Add 2 more cubes, for a total of 8 cubes. Arrange these into 1 row of 8 cubes, then 2 rows of 4 cubes each, and also 4 rows of 2 cubes each. Factors of 8 are: 1 x 8, 2 x 4, 4 x 2, 8 x 1.
So far, an odd number of cubes has not been able to make any even arrangement of rows except for 1 row of cubes. Add 1 more cube to your grouping, for a total of 9 cubes. This is the first odd number that has other factors besides itself and 1: 1 x 9, 9 x 1, and 3 x 3. Arrange the 9 cubes into 3 rows of 3 cubes each.
Show your student that his experiments have now proved that an odd number times an even number equals an even number (3 x 2 = 6). An even number times an even number equals an even number (2 x 4 = 8), and an odd number times an odd number equals an odd number (3 x 3 = 9). Those principles will remain true no matter which odd or even numbers are used — encourage your student to experiment with his sugar cubes to prove this fact.
As the child continues adding more cubes and rearranging them into factor groups, have him make a list of the factors for each number, seeing how many different ways each number can be factored. Which number (of the ones he has tried so far) has the most factors? Multiplication is nothing more than a short-cut to addition, and multiplying can save a lot of time that would be spent adding. Multiplying with bigger numbers will be much faster than adding those numbers over and over and over.
This process can also be done in reverse to illustrate division. Take a random number of sugar cubes and arrange them into rows. Can you make several rows with an equal number of cubes in each row, or do you end up with a few leftover cubes? Try several different arrangements of rows and numbers of cubes in each row. Keep trying until 1) you can come out with a square or rectangular arrangement with no leftovers, or 2) you prove that you have a prime number of sugar cubes, with no other factors than this number and 1. Whether you are multiplying or dividing, the factors remain the same — proving that division is just un-doing multiplication. The only difference is that when dividing, sometimes you can end up with a few leftovers, called the remainder.
Area is basically the same as a set of factors. It can also be thought of as floor tiles by looking straight down on top of the cubes so that only their tops can be seen. By moving the cubes around, the student can demonstrate how 1 x 12, 2 x 6, 3 x 4, 4 x 3, 6 x 2, and 12 x 1 all have the same area (they all use exactly 12 cubes). Area of a square or rectangle is determined by multiplying two connecting sides together, just like the two factors.
Perimeter can be related to how many sections of “fence” it would take to go around the outside of a certain area. The cubes’ edges can be counted as individual fence sections for an easy way to prove how many fence sections are required. Notice that each corner-cube has two exposed edges for fences. Perimeter is usually determined by adding the totals of the sides together, but multiplication can be used as a shortcut for perfect rectangles: 2 times the shorter side, plus 2 times the longer side. (Note that in a single row of cubes, the cube at each end will have 3 exposed sides to be counted.)
Experiment with various arrangements of the same group of cubes and compare the area to the perimeter. Can you change the perimeter without changing the area? What is the largest or the smallest perimeter you can make while keeping the same area?
Volume can be thought of as area in several levels. First, think of area as being a flat concept, like floor tiles, and volume being a 3-dimensional concept, like the solid sugar cubes. Arrange 2 rows of 3 cubes each, making an area of 6. Now arrange 6 more cubes in exactly the same pattern. If you stack one group on top of the other group, you can easily see 2 layers of 6 cubes each. Two rows times 3 cubes times 2 layers equals a volume of 12 cubes: 2 x 3 x 2 = 12. Try this with other groups. Multiply to find the volume: the number of rows times the number of cubes in each row equals the area of that layer. Now multiply the area times the number of layers to find the volume. How many more cubes does it take to increase the total volume of the stack of cubes?
Once your student has mastered calculating volume, combine it with measurements. Have him measure the side of one sugar cube, and then substitute that measurement in his calculations of perimeter, area, and volume. Now have him measure the sides of the large stack of sugar cubes to see if his calculations were correct. Substitute 1 inch for the measurement: if the sugar cubes measured 1 inch on each side, how large would the stack be now? How large would a stack be with 10 layers of 10 rows of 10 sugar cubes in each row? How about a stack that had 100 cubes each direction? How about 1,000? Or a million? Or a billion? (This leads directly into the study of exponents, because a square of x-number of sugar cubes is x2 and a cube of x-number of sugar cubes is x3.) How many sugar cubes would it take to make a large cube (all 3 sides equal) the approximate size of a card table? Or as tall as your house? Or as wide as a football field? Your students may need to use a calculator to check their math on these problems, but getting to use the calculator is their reward for having fun with math!
By the time your student has completed all of the activities listed above, he has probably also thought of some other activities to try with the sugar cubes. Try them–experimenting is how we learn!
Why Choose Homeschooling?
When the tomatoes at your local market are less than desirable, you may start looking elsewhere for your produce. No one intentionally shops for tomatoes that are unripe, hard, and green, or worse, bruised and blemished. If the supermarket produce is less than satisfactory, consumers may turn to a specialty grocer, the weekly farmer’s market, or start their own garden plot at home in the backyard or in a few pots on the patio or balcony.
A similar phenomenon is happening with education. Consumers (parents), who have become dissatisfied with the educational product of the mainstream schools, are turning to other means for their children’s academics, including the do-it-yourself method, homeschooling.
My husband and I turned to homeschooling because of health reasons: our daughter suffered from migraine headaches, and the school nurse didn’t believe us or our doctors. My daughter’s frequent absences were a problem with the school’s administration, although her grades never slipped, since I was able to tutor her at home and keep her on track with the rest of the students. Meanwhile, I had noticed that the classroom’s progress was not ideal. The teacher got important concepts wrong and was unable to teach critical math skills. This ineffectual teaching forced us to take matters into our own hands. Literally. I do not have a teaching degree, but I quickly realized that I could certainly do no worse than our local elementary school was already doing.
Our reasons for homeschooling are not unique. A survey of homeschooling families today would reveal many who are motivated by their children’s health concerns or special needs issues. Another, larger group would say they are dissatisfied with the quality of education provided by today’s schools, both public and private. Those parents who are re-teaching the material to their child every night, as I was, cannot help but see that they are already the primary educator of that child; they just have the worst time slot of the day in which to do it. Classroom size and the related student-to-teacher ratios, the disappearance of fine arts programs, and sex and violence in the schools are sub-topics of the “quality of education” issue.
A few more families would list flexibility as their primary reason for choosing homeschooling: students can pursue a variety of individual activities, while still maintaining their academic endeavors. Today’s homeschooled students may very well be tomorrow’s Olympic champions or symphony musicians, since the freedom of a homeschool schedule allows more time to focus on one’s passions. Childcare concerns, changes in the job market, and relocation of the family also depend on the flexibility of homeschooling to help families maintain stability during lifestyle changes.
Some families opt for homeschooling after the government schools have failed to meet their students’ needs. Some families are able to decide before preschool (or even sooner) that they want to keep their children at home for school. Some families homeschool for only a year or two, while others prefer home education from preschool through high school and even on into college-at-home. The duration is determined by the family’s preference, just as the methods and materials used are also each family’s choice.
I am often asked about the benefits of homeschooling, a difficult question simply because of the vast range of its answers. First and foremost, I see the improved relationship of the family as the chief benefit, even before any academic advantages are considered. Parents and children bond as teacher and students in a way that non-homeschooling families just cannot understand. The freedom and flexibility of the homeschooling schedule allow for spontaneous family activities, all of which have educational benefits, whether obvious (or intended) or not. That relaxed schedule is a tremendous boon to most families — the opportunity to do things in whatever order or method works best for each family and each student (which, incidentally, is the philosophy of Guilt-Free Homeschooling: homeschooling should be comfortable, relaxed, and fit your family’s lifestyle).
The one-on-one attention that homeschooling provides is far superior to any classroom. Even large families are able to provide individual attention to each student when he needs it, along with the training in independent learning, which prepares homeschooled students for handling college classes (and life in general) on their own. Parents of special needs students find that no teacher, no matter how well trained, can know the student or love the student as well as the parent can. The parent who has lived with the special needs child 24/7 since birth understands more and at a deeper level than a teacher who is hired to cover seven hours a day, five days a week, nine months of the year.
Homeschooling is extremely popular with conservative Christian families, although it is practiced by families of every religious and political persuasion. Besides the reasons of academic excellence and personalization, homeschooling allows families to emphasize their own philosophies and worldviews. Government-mandated curricula are often based on evolutionary principles, which are diametrically opposed to Creationists’ beliefs. Homeschooling allows these families to use materials that support their beliefs, such as that life is sacred and a precious gift from God, the Creator. Government-funded schools do not allow prayer and do not teach the Bible, even as literature, although many anti-Christian religious philosophies and practices are now showing up in those same schools under the guise of “diversity.” Families for whom personal Christianity is the guiding force in their lives want to see their children educated with God-centered principles, a Creationist viewpoint, and a Biblical worldview. They will not accept submitting their children to antithetical teaching day in and day out.
Homeschooling is not a fad, although some people treat it as such. Public schools, sponsored by a government, are the “new kid on the block.” Personal tutoring had been the educational standard for centuries, until the time of the American Civil War, when it became fashionable to apply industrial methods to education by grouping local children together for academic efficiency. The homeschooling movement, in general, is providing a return to excellence and individuality in education, a return to a focus on the family as an institution in society, and a return to individual responsibility as a primary duty of citizenship. In this postmodern era, some old-fashioned homeschooling is just what this world needs.
Are You an “Over-Protective” Mom?
I hear this from concerned, young moms all the time: “My friends tell me I’m an over-protective Mom.” I suspect your friends are wrong. What you are is a Mom — period. You should not be penalized or chastised for simply doing your job to the best of your ability. Neither should you lower your standards to match those of your acquaintances who may have chosen to offer their children on the sacrificial altar of peer pressure.
How many people would consider the following to be over-protective?
- Mom wants to have a say in what her child is taught.
- Mom wants to have a say in when he is taught it.
- Mom wants to have a say in what friends her child associates with.
- Mom wants to have a say in when he associates with them.
- Mom wants to have a say in what type of food her child eats.
- Mom wants her child to avoid substances that will cause him to suffer allergic reactions.
- Mom wants her child to be safe from harmful substances.
- Mom wants her child to be safe from harmful influences.
- Mom wants her child to be safe from harmful situations.
- Mom wants her child’s needs to be met in a reasonable manner and time period.
- Mom wants her child to know unrestrained love.
Just in case you are not sure how to answer the above question, let me broaden the subject a little bit. Suppose that instead of talking about an ordinary Mom, we are discussing the owner of a business:
- The employer insists that his staff members learn to do their projects to his standards.
- The employer insists that his staff members complete their projects according to his schedule.
- The employer insists on hiring only staff members who exhibit a work ethic similar to his own.
- The employer insists on establishing safety regulations and further insists that all employees follow those regulations.
- The employer insists on approving the production materials that are used.
- The employer insists on exercising his right to reward superior performance.
Essentially, a Mom performs all the same general functions that a business owner does, but the businessman is usually praised by his peers for his efforts to achieve excellence in productivity. The Mom is, unfortunately, scolded by her peers as being over-protective.
- Where the employer may be seen as caring and compassionate, Mom is considered “smothering.”
- Where an employer may be considered efficient, Mom is called “dictatorial.”
- When an employer chooses high standards to produce an excellent product, a Mom, doing exactly the same thing for the same reasons, is often regarded as “too picky” and “a perfectionist.”
Moms, take a good, long, serious look at your principles and your standards and your reasons for choosing them. If those standards and principles were applied in a business setting, would they be praised by your customers and envied by your competitors? If your methods would be lauded for their excellence by the business world, then you can tell your critics to go find someone else to harass, because you will no longer be listening to them. (Then walk away with your fingers in your ears to prove that they have lost their audience.)
As just another Mom myself, I understand that caring Moms are not trying to control their universe; they are simply trying to do what is best for their children’s well-being. No sane mother wants to see her child kept isolated on a silken pillow as an object of adoration. On the contrary, mothers have hopes and dreams and aspirations for whatever level of success each child will attain, and every sane mother knows that this success cannot be achieved without hard work. Hard work means struggles, and those struggles come from encountering difficulties. Therefore, mothers actually want their children to confront and overcome certain difficulties, since that means that they are on the road to success.
Our job as Moms means that we act as road maps, traffic cops, crossing guards, and travel guides to help our children learn where to go, how to go, when it will be safe to go there, and how to get around once they arrive. Anyone who sees that as being “over-protective” is in the same category as those who feel automotive seat belts, traffic lights, and speed limits are “restrictive” infringements on their self-expression.
A caring Mom keeps her children from being side-tracked away from the truly important issues. A diligent Mom keeps her children moving in the proper direction and at a pace appropriate to the circumstances. A conscientious Mom is not being over-protective: she is doing her job and doing it well. Go, then, and do your job as a Mom, raising your children to the best of your ability. You have my approval.
If you enjoyed this article, you may also enjoy Standing Up Against “The Lie”.
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